Integermania - Four Nines

$ \def\pm{{ ‰}} \def\pmf{{ ‰ \phantom.}} \def\pmm{{ ‰ \! ‰}} \def\pmmf{{ ‰ \! ‰ \phantom\%}} \DeclareMathOperator {\sech} {sech} \DeclareMathOperator {\csch} {csch} $

Integermania!

Four Nines

This problem was proposed by Integermaniac master Ralph Jeffords. Create each of the positive integers using four copies of 9, and any standard operations. All four numbers must be used, but no others. Your solutions will be assigned an exquisiteness level.

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Use the online submissions page to get your Integermania solutions posted here! This problem is now in semi-retired status, so you may submit an unlimited number of solutions each month.

Page 1 (1-400), Page 2 (401+).

401 (4.0) $\dfrac{9 + \sqrt{9}}{(\sqrt{9})\%} + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	402 (4.2) $\dfrac{9 + \sqrt{9} + (\sqrt{9})!\%}{(\sqrt{9})\%}$ Steve Wilson, 8/23 Lawrence, KS	403 (3.8) $\dfrac{9!\% - .9 - .9}{9}$ Steve Wilson, 8/23 Lawrence, KS		405 (3.8) $9 \times 9 \times ((\sqrt{9})! - .\overline{9})$ Steve Wilson, 8/23 Lawrence, KS	406 (4.0) $\dfrac{9 + \sqrt{9}}{(\sqrt{9})\%} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS		408 (4.2) $((\sqrt{9})! - .9) \times \dfrac{((\sqrt{9})!)!}{9}$ Steve Wilson, 8/23 Lawrence, KS	409 (3.6) $\dfrac{9 + \sqrt{9}}{(\sqrt{9})\%} + 9$ Steve Wilson, 8/23 Lawrence, KS	410 (4.0) $\dfrac{9 + \sqrt{9} + \sqrt{9\%}}{(\sqrt{9})\%}$ Steve Wilson, 8/23 Lawrence, KS
								419 (4.8) $\dfrac{\ln\sqrt{\exp 9}}{9\pmf} - 9 \times 9$ Steve Wilson, 8/23 Lawrence, KS	420 (4.6) $\dfrac{.9 + \sqrt{9\%} + (\sqrt{9})!\%}{(\sqrt{9})\pmf}$ Steve Wilson, 8/23 Lawrence, KS
		423 (4.8) $((\sqrt{9})!)! \times \dfrac{(\sqrt{9})!\pmf}{.\overline{9}\%} - 9$ Steve Wilson, 8/23 Lawrence, KS							430 (3.6) $\dfrac{9.9 + \sqrt{9}}{(\sqrt{9})\%}$ Steve Wilson, 8/23 Lawrence, KS
431 (4.4) $\dfrac{99}{\csch\ln 9} - 9$ Steve Wilson, 8/23 Lawrence, KS	432 (4.6) $(9 - \sqrt{9})! \times \dfrac{(\sqrt{9})!\pmf}{.\overline{9}\%}$ Steve Wilson, 8/23 Lawrence, KS		434 (4.8) $\dfrac{99}{\csch\ln 9} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	435 (4.0) $\dfrac{9 \times \sqrt{9} - .9}{(\sqrt{9})!\%}$ Steve Wilson, 8/23 Lawrence, KS		437 (4.6) $\dfrac{99}{\csch\ln 9} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	438 (3.8) $\dfrac{\dfrac{9!\pmf}{9} - .9}{9\%}$ Steve Wilson, 8/23 Lawrence, KS	439 (3.6) $\dfrac{9!\pmf}{9 \times 9\%} - 9$ Steve Wilson, 8/23 Lawrence, KS	440 (4.6) $\dfrac{.9 \times \sqrt{9} - (\sqrt{9})!\%}{(\sqrt{9})!\pmf}$ Steve Wilson, 8/23 Lawrence, KS
441 (3.0) $\dfrac{9}{(.\overline{9} + .\overline{9})\%} - 9$ Steve Wilson, 1/09 Raytown, MO	442 (4.0) $\dfrac{9!\pmf}{9 \times 9\%} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	443 (4.6) $\dfrac{99}{\csch\ln 9} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	444 (4.2) $\dfrac{9 \times \sqrt{9}}{(\sqrt{9})!\%} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	445 (3.8) $\dfrac{9!\pmf}{9 \times 9\%} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	446 (4.8) $\dfrac{99}{\csch\ln 9} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	447 (3.8) $\dfrac{\dfrac{9!\pmf}{9} - 9\%}{9\%}$ Steve Wilson, 8/23 Lawrence, KS	448 (3.6) $\dfrac{\left(9 - \dfrac99\right)!\%}{.9}$ Steve Wilson, 8/23 Lawrence, KS	449 (3.4) $\dfrac{9}{(.\overline{9} + .\overline{9})\%} - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	450 (2.2) $\dfrac{9}{(9 + 9)\%} \times 9$ Dave Jones, 6/08 Coventry, England
451 (3.4) $\dfrac{9}{(.\overline{9} + .\overline{9})\%} + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	452 (4.8) $\dfrac{99}{\sech\ln 9} + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	453 (4.0) $\dfrac{9 \times \sqrt{9}}{(\sqrt{9})!\%} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	454 (4.0) $\dfrac{9!\pmf}{9 \times 9\%} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS		456 (4.2) $\dfrac{9 \times \sqrt{9}}{(\sqrt{9})!\%} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	457 (3.6) $\dfrac{9!\pmf}{9 \times 9\%} + 9$ Steve Wilson, 8/23 Lawrence, KS	458 (3.8) $\dfrac{\dfrac{9!\pmf}{9} + .9}{9\%}$ Steve Wilson, 8/23 Lawrence, KS	459 (3.0) $\dfrac{9}{(.\overline{9} + .\overline{9})\%} + 9$ Steve Wilson, 1/09 Raytown, MO	460 (4.4) $\dfrac{99}{\sech\ln 9} + 9$ Steve Wilson, 8/23 Lawrence, KS
				465 (4.0) $\dfrac{9 \times \sqrt{9} + .9}{(\sqrt{9})!\%}$ Steve Wilson, 8/23 Lawrence, KS					470 (4.6) $\dfrac{((\sqrt{9})!)! \times (\sqrt{9})!\% - .9}{9\%}$ Steve Wilson, 8/23 Lawrence, KS
471 (4.0) $((\sqrt{9})!)! \times \dfrac{(\sqrt{9})!}{9} - 9$ Steve Wilson, 8/23 Lawrence, KS			474 (4.0) $(((\sqrt{9})!)! - 9) \times \dfrac{(\sqrt{9})!}{9}$ Steve Wilson, 8/23 Lawrence, KS		476 (4.4) $(((\sqrt{9})!)! - (\sqrt{9})!) \times \dfrac{(\sqrt{9})!}{9}$ Steve Wilson, 8/23 Lawrence, KS	477 (4.2) $((\sqrt{9})!)! \times \dfrac{(\sqrt{9})!}{9} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	478 (4.2) $(((\sqrt{9})!)! - \sqrt{9}) \times \dfrac{(\sqrt{9})!}{9}$ Steve Wilson, 8/23 Lawrence, KS	479 (4.4) $((\sqrt{9})!)! \times \dfrac{(\sqrt{9})!}{9} - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	480 (3.8) $(9 - \sqrt{9})! \times \dfrac{(\sqrt{9})!}{9}$ Steve Wilson, 8/23 Lawrence, KS
481 (4.4) $((\sqrt{9})!)! \times \dfrac{(\sqrt{9})!}{9} + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	482 (4.2) $(((\sqrt{9})!)! + \sqrt{9}) \times \dfrac{(\sqrt{9})!}{9}$ Steve Wilson, 8/23 Lawrence, KS	483 (4.2) $((\sqrt{9})!)! \times \dfrac{(\sqrt{9})!}{9} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	484 (4.4) $(((\sqrt{9})!)! + (\sqrt{9})!) \times \dfrac{(\sqrt{9})!}{9}$ Steve Wilson, 8/23 Lawrence, KS		486 (4.0) $(((\sqrt{9})!)! + 9) \times \dfrac{(\sqrt{9})!}{9}$ Steve Wilson, 8/23 Lawrence, KS			489 (4.0) $((\sqrt{9})!)! \times \dfrac{(\sqrt{9})!}{9} + 9$ Steve Wilson, 8/23 Lawrence, KS	490 (4.6) $\dfrac{((\sqrt{9})!)! \times (\sqrt{9})!\% + .9}{9\%}$ Steve Wilson, 8/23 Lawrence, KS
491 (2.6) $\dfrac{9}{(.9 + .9)\%} - 9$ Dave Jones, 6/08 Coventry, England			494 (3.6) $\dfrac{9}{(9 + 9)\pmf} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	495 (2.8) $\dfrac{9 - 9\%}{(.9 + .9)\%}$ Steve Wilson, 1/09 Raytown, MO		497 (3.4) $\dfrac{9}{(9 + 9)\pmf} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS		499 (3.0) $\dfrac{9}{(.9 + .9)\%} - .\overline{9}$ Steve Wilson, 3/10 Raytown, MO	500 (3.0) $\dfrac{9}{(.9 + .9)\%} \times .\overline{9}$ Steve Wilson, 3/10 Raytown, MO
501 (3.0) $\dfrac{9}{(.9 + .9)\%} + .\overline{9}$ Steve Wilson, 3/10 Raytown, MO		503 (3.4) $\dfrac{9}{(9 + 9)\pmf} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	504 (4.8) $(9 + 9) \times (9 - \coth\ln\sqrt{.9})$ Steve Wilson, 8/23 Lawrence, KS	505 (2.8) $\dfrac{9 + 9\%}{(.9 + .9)\%}$ Steve Wilson, 1/09 Raytown, MO	506 (3.6) $\dfrac{9}{(9 + 9)\pmf} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			509 (2.6) $\dfrac{9}{(.9 + .9)\%} + 9$ Dave Jones, 6/08 Coventry, England	510 (3.8) $((\sqrt{9})! - .9) \times \dfrac{9}{9\%}$ Steve Wilson, 8/23 Lawrence, KS
511 (4.0) $(9 - .\overline{9})^{\sqrt{9}} - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	512 (3.0) $\left(\dfrac{9 + 9}{9}\right)^9$ Steve Wilson, 8/23 Lawrence, KS	513 (4.0) $(9 - .\overline{9})^{\sqrt{9}} + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS		515 (3.8) $(9 - .\overline{9})^{\sqrt{9}} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS			518 (4.0) $(9 - .\overline{9})^{\sqrt{9}} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS		520 (3.8) $((\sqrt{9})!)! - \dfrac{9 + 9}{9\%}$ Steve Wilson, 8/23 Lawrence, KS
521 (3.6) $(9 - .\overline{9})^{\sqrt{9}} + 9$ Steve Wilson, 8/23 Lawrence, KS									530 (4.8) $\dfrac{9 \times (\sqrt{9})!\% + .\overline{9}\%}{.\overline{9}\pmf}$ Steve Wilson, 8/23 Lawrence, KS
531 (4.2) $\dfrac{9 \times (\sqrt{9})!\%}{.\overline{9}\pmf} - 9$ Steve Wilson, 8/23 Lawrence, KS			534 (4.6) $\dfrac{9 \times (\sqrt{9})!\%}{.\overline{9}\pmf} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			537 (4.4) $\dfrac{9 \times (\sqrt{9})!\%}{.\overline{9}\pmf} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS		539 (4.6) $\dfrac{9 \times (\sqrt{9})!\%}{.\overline{9}\pmf} - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	540 (3.8) $(9 - .9) \times \dfrac{(\sqrt{9})!}{9\%}$ Steve Wilson, 8/23 Lawrence, KS
541 (4.6) $\dfrac{9 \times (\sqrt{9})!\%}{.\overline{9}\pmf} + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS		543 (4.4) $\dfrac{9 \times (\sqrt{9})!\%}{.\overline{9}\pmf} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS			546 (4.4) $\dfrac{(\sqrt{9})!}{.\overline{9}\%} - 9 \times (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS		548 (3.6) $\dfrac{\dfrac{9!\pmf}{9} + 9}{9\%}$ Steve Wilson, 8/23 Lawrence, KS	549 (4.2) $\dfrac{9 \times (\sqrt{9})!\%}{.\overline{9}\pmf} + 9$ Steve Wilson, 8/23 Lawrence, KS	550 (2.2) $\dfrac{99}{(9 + 9)\%}$ Dave Jones, 7/08 Coventry, England
	552 (4.2) $((\sqrt{9})! + .9) \times \dfrac{((\sqrt{9})!)!}{9}$ Steve Wilson, 8/23 Lawrence, KS						558 (4.8) $9 \times (9 \times 9 + \coth\ln\sqrt{.9})$ Steve Wilson, 8/23 Lawrence, KS		560 (4.4) $((\sqrt{9})! + .\overline{9}) \times \dfrac{((\sqrt{9})!)!}{9}$ Steve Wilson, 8/23 Lawrence, KS
561 (4.2) $((\sqrt{9})!)! - \dfrac{9}{(\sqrt{9})!\%} - 9$ Steve Wilson, 8/23 Lawrence, KS			564 (4.6) $((\sqrt{9})!)! - \dfrac{9}{(\sqrt{9})!\%} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			567 (3.8) $9 \times 9 \times ((\sqrt{9})! + .\overline{9})$ Steve Wilson, 8/23 Lawrence, KS		569 (4.6) $((\sqrt{9})!)! - \dfrac{9}{(\sqrt{9})!\%} - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	570 (4.0) $(9 - \sqrt{9})! - \dfrac{9}{(\sqrt{9})!\%}$ Steve Wilson, 8/23 Lawrence, KS
571 (4.6) $((\sqrt{9})!)! - \dfrac{9}{(\sqrt{9})!\%} + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS		573 (4.2) $\dfrac{(\sqrt{9})!}{.\overline{9}\%} - 9 \times \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS			576 (4.6) $((\sqrt{9})!)! - \dfrac{9}{(\sqrt{9})!\%} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			579 (4.2) $((\sqrt{9})!)! - \dfrac{9}{(\sqrt{9})!\%} + 9$ Steve Wilson, 8/23 Lawrence, KS	580 (4.4) $\dfrac{.9 + .9 - (\sqrt{9})!\%}{(\sqrt{9})\pmf}$ Steve Wilson, 8/23 Lawrence, KS
581 (4.8) $\dfrac{\ln\sqrt{\exp 9}}{9\pmf} + 9 \times 9$ Steve Wilson, 8/23 Lawrence, KS	582 (4.0) $\dfrac{(\sqrt{9})!}{.\overline{9}\%} - 9 - 9$ Steve Wilson, 8/23 Lawrence, KS			585 (4.6) $\dfrac{(\sqrt{9})! - (9 + (\sqrt{9})!)\%}{.\overline{9}\%}$ Steve Wilson, 8/23 Lawrence, KS			588 (4.4) $\dfrac{(\sqrt{9})! - (9 + \sqrt{9})\%}{.\overline{9}\%}$ Steve Wilson, 8/23 Lawrence, KS		590 (3.8) $\dfrac{(\sqrt{9})! \times 9 - .9}{9\%}$ Steve Wilson, 8/23 Lawrence, KS
591 (3.6) $(\sqrt{9})! \times \dfrac{9}{9\%} - 9$ Steve Wilson, 8/23 Lawrence, KS			594 (3.2) $99 \times (9 - \sqrt{9})$ Steve Wilson, 8/23 Lawrence, KS			597 (3.8) $(\sqrt{9})! \times \dfrac{9}{9\%} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS		599 (3.8) $\dfrac{(\sqrt{9})! \times 9 - 9\%}{9\%}$ Steve Wilson, 8/23 Lawrence, KS	600 (3.4) $(9 - \sqrt{9}) \times \dfrac{9}{9\%}$ Steve Wilson, 8/23 Lawrence, KS
601 (3.8) $\dfrac{(\sqrt{9})! \times 9 + 9\%}{9\%}$ Steve Wilson, 8/23 Lawrence, KS		603 (3.8) $(\sqrt{9})! \times \dfrac{9}{9\%} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS			606 (3.8) $(\sqrt{9})! \times \dfrac{9 + 9\%}{9\%}$ Steve Wilson, 8/23 Lawrence, KS			609 (3.6) $(\sqrt{9})! \times \dfrac{9}{9\%} + 9$ Steve Wilson, 8/23 Lawrence, KS	610 (3.8) $((\sqrt{9})!)! - \dfrac{99}{.9}$ Steve Wilson, 8/23 Lawrence, KS
611 (3.8) $((\sqrt{9})!)! - \dfrac{9}{9\%} - 9$ Steve Wilson, 8/23 Lawrence, KS	612 (3.6) $((\sqrt{9})!)! - 99 - 9$ Steve Wilson, 8/23 Lawrence, KS		614 (4.2) $((\sqrt{9})!)! - \dfrac{9}{9\%} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	615 (4.0) $((\sqrt{9})!)! - 99 - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS		617 (4.0) $((\sqrt{9})!)! - \dfrac{9}{9\%} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	618 (3.8) $((\sqrt{9})!)! - 99 - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	619 (4.0) $((\sqrt{9})!)! - \dfrac{9 + 9\%}{9\%}$ Steve Wilson, 8/23 Lawrence, KS	620 (3.6) $(9 - \sqrt{9})! - \dfrac{9}{9\%}$ Steve Wilson, 8/23 Lawrence, KS
621 (3.4) $(9 - \sqrt{9})! - 99$ Steve Wilson, 8/23 Lawrence, KS	622 (4.0) $((\sqrt{9})!)! - 99 + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	623 (4.0) $((\sqrt{9})!)! - \dfrac{9}{9\%} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	624 (3.8) $((\sqrt{9})!)! - 99 + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS		626 (4.2) $((\sqrt{9})!)! - \dfrac{9}{9\%} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	627 (4.0) $((\sqrt{9})!)! - 99 + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS		629 (3.4) $9^{\sqrt{9}} - \dfrac{9}{9\%}$ Steve Wilson, 8/23 Lawrence, KS	630 (3.2) $9^{\sqrt{9}} - 99$ Steve Wilson, 8/23 Lawrence, KS
		633 (4.0) $((\sqrt{9})!)! - 9 \times 9 - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			636 (3.8) $((\sqrt{9})!)! - 9 \times 9 - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS		638 (4.0) $((\sqrt{9})!)! - 9 \times 9 - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	639 (3.8) $(9 - \sqrt{9})! - 9 \times 9$ Steve Wilson, 8/23 Lawrence, KS	640 (4.0) $((\sqrt{9})!)! - 9 \times 9 + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS
	642 (3.8) $((\sqrt{9})!)! - 9 \times 9 + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS			645 (3.8) $(9 - \sqrt{9})! \times .9 - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS		647 (3.8) $((\sqrt{9})!)! \times .9 - \dfrac99$ Steve Wilson, 8/23 Lawrence, KS	648 (1.0) $(9 \times 9 - 9) \times 9$ Dave Jones, 2/08 Coventry, England	649 (3.8) $((\sqrt{9})!)! \times .9 + \dfrac99$ Steve Wilson, 8/23 Lawrence, KS	650 (4.4) $((\sqrt{9})!)! - \dfrac{\sqrt{9} - .9}{(\sqrt{9})\%}$ Steve Wilson, 8/23 Lawrence, KS
651 (3.8) $(9 - \sqrt{9})! \times .9 + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS			654 (4.0) $(9 - \sqrt{9})! \times .9 + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			657 (3.6) $(9 - \sqrt{9})! \times .9 + 9$ Steve Wilson, 8/23 Lawrence, KS			660 (3.6) $99 \times \dfrac{(\sqrt{9})!}{.9}$ Steve Wilson, 8/23 Lawrence, KS
		663 (4.2) $((\sqrt{9})!)! - 9 \times (\sqrt{9})! - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS		665 (4.4) $((\sqrt{9})!)! - 9 \times (\sqrt{9})! - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	666 (3.8) $((\sqrt{9})!)! - 9 \times (9 - \sqrt{9})$ Steve Wilson, 8/23 Lawrence, KS	667 (4.4) $((\sqrt{9})!)! - 9 \times (\sqrt{9})! + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS		669 (4.2) $((\sqrt{9})!)! - 9 \times (\sqrt{9})! + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	670 (3.8) $((\sqrt{9})!)! - \dfrac{9}{(9 + 9)\%}$ Steve Wilson, 8/23 Lawrence, KS
	672 (4.4) $((\sqrt{9})!)! - (9 + .\overline{9}) \times (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			675 (3.6) $9^{\sqrt{9}} - 9 \times (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS					680 (4.2) $((\sqrt{9})!)! - \dfrac{9 + \sqrt{9}}{\sqrt{9\%}}$ Steve Wilson, 8/23 Lawrence, KS
681 (4.8) $((\sqrt{9})!)! - \dfrac{(\sqrt{9} - .9)\%}{.\overline{9}\pmf}$ Steve Wilson, 8/23 Lawrence, KS			684 (3.8) $((\sqrt{9})!)! - 9 \times \sqrt{9} - 9$ Steve Wilson, 8/23 Lawrence, KS			687 (4.2) $((\sqrt{9})!)! - 9 \times \sqrt{9} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS		689 (4.4) $((\sqrt{9})!)! - \dfrac{9}{\sqrt{9\%}} - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	690 (3.8) $((\sqrt{9})! + .9) \times \dfrac{9}{9\%}$ Steve Wilson, 8/23 Lawrence, KS
691 (4.4) $((\sqrt{9})!)! - \dfrac{9}{\sqrt{9\%}} + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	692 (4.2) $((\sqrt{9})!)! - 9 \times \sqrt{9} - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	693 (3.6) $((\sqrt{9})!)! - 9 - 9 - 9$ Steve Wilson, 8/23 Lawrence, KS	694 (4.2) $((\sqrt{9})!)! - 9 \times \sqrt{9} + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS		696 (4.0) $((\sqrt{9})!)! - 9 - 9 - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			699 (3.6) $9^{\sqrt{9}} - \dfrac{9}{\sqrt{9\%}}$ Steve Wilson, 8/23 Lawrence, KS	700 (3.8) $((\sqrt{9})!)! - \dfrac{9 + 9}{.9}$ Steve Wilson, 8/23 Lawrence, KS
701 (3.8) $((\sqrt{9})!)! - \dfrac{9}{.9} - 9$ Steve Wilson, 8/23 Lawrence, KS	702 (3.4) $9^{\sqrt{9}} - 9 \times \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	703 (4.0) $((\sqrt{9})!)! - 9 - 9 + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	704 (4.2) $((\sqrt{9})!)! - \dfrac{9}{.9} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	705 (3.8) $(9 - \sqrt{9})! - 9 - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	706 (4.4) $((\sqrt{9})!)! - 9 - (\sqrt{9})! + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	707 (4.0) $((\sqrt{9})!)! - \dfrac{9}{.9} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	708 (3.6) $(9 - \sqrt{9})! - 9 - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	709 (3.6) $((\sqrt{9})!)! - \dfrac{99}{9}$ Steve Wilson, 8/23 Lawrence, KS	710 (3.6) $(9 - \sqrt{9})! - \dfrac{9}{.9}$ Steve Wilson, 8/23 Lawrence, KS
711 (3.2) $9^{\sqrt{9}} - 9 - 9$ Chelsea Kiddle, 11/12 Leawood, KS	712 (3.8) $(9 - \sqrt{9})! - 9 + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	713 (4.0) $((\sqrt{9})!)! - \dfrac{9}{.9} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	714 (3.6) $9^{\sqrt{9}} - 9 - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	715 (4.0) $((\sqrt{9})!)! - (\sqrt{9})! + \dfrac99$ Steve Wilson, 8/23 Lawrence, KS	716 (3.8) $((\sqrt{9})!)! - \sqrt{9} - \dfrac99$ Steve Wilson, 8/23 Lawrence, KS	717 (3.4) $9^{\sqrt{9}} - 9 - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	718 (3.6) $((\sqrt{9})!)! - \dfrac{9 + 9}{9}$ Steve Wilson, 8/23 Lawrence, KS	719 (3.4) $9^{\sqrt{9}} - 9.\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	720 (1.0) $9 \times 9 \times 9 - 9$ Renato Bacco, 11/07 Overland Park, KS
721 (3.4) $(9 - \sqrt{9})! + \dfrac99$ Steve Wilson, 8/23 Lawrence, KS	722 (3.6) $((\sqrt{9})!)! + \dfrac{9 + 9}{9}$ Steve Wilson, 8/23 Lawrence, KS	723 (3.4) $9 \times 9 \times 9 - (\sqrt{9})!$ Steve Wilson, 12/09 Raytown, MO	724 (3.8) $((\sqrt{9})!)! + \sqrt{9} + \dfrac99$ Steve Wilson, 8/23 Lawrence, KS	725 (4.0) $((\sqrt{9})!)! + (\sqrt{9})! - \dfrac99$ Steve Wilson, 8/23 Lawrence, KS	726 (3.2) $9 \times 9 \times 9 - \sqrt{9}$ Austin Timmons, 10/08 Olathe, KS	727 (4.0) $((\sqrt{9})!)! + (\sqrt{9})! + \dfrac99$ Steve Wilson, 8/23 Lawrence, KS	728 (2.4) $9 \times 9 \times 9 - .\overline{9}$ Steve Wilson, 4/10 Raytown, MO	729 (2.4) $9 \times 9 \times 9 \times .\overline{9}$ Steve Wilson, 4/10 Raytown, MO	730 (2.4) $9 \times 9 \times 9 + .\overline{9}$ Steve Wilson, 4/10 Raytown, MO
731 (3.6) $((\sqrt{9})!)! + \dfrac{99}{9}$ Steve Wilson, 8/23 Lawrence, KS	732 (3.2) $9 \times 9 \times 9 + \sqrt{9}$ Austin Timmons, 10/08 Olathe, KS	733 (3.8) $9^{\sqrt{9}} + \sqrt{9} + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	734 (4.0) $9^{\sqrt{9}} + (\sqrt{9})! - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	735 (3.4) $9 \times 9 \times 9 + (\sqrt{9})!$ Steve Wilson, 12/09 Raytown, MO	736 (4.0) $9^{\sqrt{9}} + (\sqrt{9})! + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	737 (3.6) $9^{\sqrt{9}} + 9 - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	738 (1.0) $9 \times 9 \times 9 + 9$ Renato Bacco, 11/07 Overland Park, KS	739 (3.4) $9^{\sqrt{9}} + 9.\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	740 (3.8) $((\sqrt{9})!)! + \dfrac{9 + 9}{.9}$ Steve Wilson, 8/23 Lawrence, KS
741 (3.4) $9^{\sqrt{9}} + 9 + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS			744 (3.6) $9^{\sqrt{9}} + 9 \times (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS		746 (4.2) $((\sqrt{9})!)! + 9 \times \sqrt{9} - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	747 (3.2) $9^{\sqrt{9}} + 9 + 9$ Chelsea Kiddle, 11/12 Leawood, KS	748 (4.2) $((\sqrt{9})!)! + 9 \times \sqrt{9} + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	749 (4.4) $((\sqrt{9})!)! + \dfrac{9}{\sqrt{9\%}} - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	750 (3.8) $(9 - \sqrt{9})! + \dfrac{9}{\sqrt{9\%}}$ Steve Wilson, 8/23 Lawrence, KS
751 (4.4) $((\sqrt{9})!)! + \dfrac{9}{\sqrt{9\%}} + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS		753 (3.8) $((\sqrt{9})!)! + \dfrac{99}{\sqrt{9}}$ Steve Wilson, 8/23 Lawrence, KS			756 (3.4) $9^{\sqrt{9}} + 9 \times \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS			759 (3.6) $9^{\sqrt{9}} + \dfrac{9}{\sqrt{9\%}}$ Steve Wilson, 8/23 Lawrence, KS	760 (4.2) $((\sqrt{9})!)! + \dfrac{9 + \sqrt{9}}{\sqrt{9\%}}$ Steve Wilson, 8/23 Lawrence, KS
			764 (4.6) $\dfrac{((\sqrt{9})!)!}{.9} - (\sqrt{9})! \times (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS						770 (3.8) $((\sqrt{9})!)! + \dfrac{9}{(9 + 9)\%}$ Steve Wilson, 8/23 Lawrence, KS
		773 (4.0) $\dfrac{((\sqrt{9})!)!}{.9} - 9 \times \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	774 (3.8) $((\sqrt{9})!)! + 9 \times (9 - \sqrt{9})$ Steve Wilson, 8/23 Lawrence, KS						780 (3.8) $\dfrac{((\sqrt{9})!)! - 9 - 9}{.9}$ Steve Wilson, 8/23 Lawrence, KS
781 (3.8) $\dfrac{((\sqrt{9})!)! - 9}{.9} - 9$ Steve Wilson, 8/23 Lawrence, KS	782 (3.8) $\dfrac{((\sqrt{9})!)!}{.9} - 9 - 9$ Steve Wilson, 8/23 Lawrence, KS	783 (3.6) $9^{\sqrt{9}} + 9 \times (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	784 (4.2) $\dfrac{((\sqrt{9})!)! - 9}{.9} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	785 (4.2) $\dfrac{((\sqrt{9})!)!}{.9} - 9 - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS		787 (4.0) $\dfrac{((\sqrt{9})!)! - 9}{.9} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	788 (4.0) $\dfrac{((\sqrt{9})!)!}{.9} - 9 - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	789 (4.2) $\dfrac{((\sqrt{9})!)! - 9}{.9} - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	790 (3.6) $\dfrac{(9 - \sqrt{9})! - 9}{.9}$ Steve Wilson, 8/23 Lawrence, KS
791 (3.0) $\dfrac{9 - .\overline{9}}{.\overline{9}\%} - 9$ Steve Wilson, 4/10 Raytown, MO	792 (2.4) $99 \times (9 - .\overline{9})$ Steve Wilson, 5/10 Raytown, MO	793 (4.0) $\dfrac{((\sqrt{9})!)! - 9}{.9} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	794 (4.0) $\dfrac{(9 - \sqrt{9})!}{.9} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	795 (4.0) $((\sqrt{9})!)! + 9 \times 9 - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	796 (4.2) $\dfrac{((\sqrt{9})!)! - 9}{.9} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	797 (3.8) $\dfrac{(9 - \sqrt{9})!}{.9} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	798 (3.8) $((\sqrt{9})!)! + 9 \times 9 - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	799 (3.8) $\dfrac{((\sqrt{9})!)!}{.9} - \dfrac99$ Steve Wilson, 8/23 Lawrence, KS	800 (2.2) $\dfrac{9 \times 9 - 9}{9\%}$ Dave Jones, 7/08 Coventry, England
801 (2.6) $\dfrac{9}{.\overline{9}\%} - 99$ Steve Wilson, 5/10 Raytown, MO	802 (4.4) $\dfrac{((\sqrt{9})!)!}{.9} + \sqrt{9} - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	803 (3.8) $\dfrac{(9 - \sqrt{9})!}{.9} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	804 (3.8) $((\sqrt{9})!)! + 9 \times 9 + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	805 (4.6) $\dfrac{((\sqrt{9})!)!}{.9} + (\sqrt{9})! - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	806 (4.0) $\dfrac{(9 - \sqrt{9})!}{.9} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	807 (4.0) $((\sqrt{9})!)! + 9 \times 9 + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	808 (4.2) $\dfrac{((\sqrt{9})!)!}{.9} + 9 - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	809 (3.0) $\dfrac{9 - .\overline{9}}{.\overline{9}\%} + 9$ Steve Wilson, 4/10 Raytown, MO	810 (1.0) $(9 \times 9 + 9) \times 9$ Dave Jones, 2/08 Coventry, England
811 (3.8) $((\sqrt{9})!)! + \dfrac{9}{9\%} - 9$ Steve Wilson, 8/23 Lawrence, KS	812 (4.0) $\dfrac{((\sqrt{9})!)!}{.9} + 9 + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	813 (4.0) $((\sqrt{9})!)! + 99 - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	814 (4.2) $((\sqrt{9})!)! + \dfrac{9}{9\%} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	815 (4.2) $\dfrac{((\sqrt{9})!)!}{.9} + 9 + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	816 (3.8) $((\sqrt{9})!)! + 99 - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	817 (4.0) $((\sqrt{9})!)! + \dfrac{9}{9\%} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	818 (3.8) $\dfrac{((\sqrt{9})!)!}{.9} + 9 + 9$ Steve Wilson, 8/23 Lawrence, KS	819 (2.2) $9 \times \left( \dfrac{9}{9\%} - 9 \right)$ Dave Jones, 7/08 Coventry, England	820 (3.6) $(9 - \sqrt{9})! + \dfrac{9}{9\%}$ Steve Wilson, 8/23 Lawrence, KS
821 (4.2) $((\sqrt{9})!)! + \dfrac{9 + 9\%}{9\%}$ Steve Wilson, 8/23 Lawrence, KS	822 (3.8) $((\sqrt{9})!)! + 99 + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	823 (4.0) $((\sqrt{9})!)! + \dfrac{9}{9\%} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS		825 (4.0) $((\sqrt{9})!)! + 99 + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	826 (4.2) $((\sqrt{9})!)! + \dfrac{9}{9\%} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	827 (4.0) $\dfrac{((\sqrt{9})!)!}{.9} + 9 \times \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	828 (3.6) $((\sqrt{9})!)! + 99 + 9$ Steve Wilson, 8/23 Lawrence, KS	829 (3.4) $9^{\sqrt{9}} + \dfrac{9}{9\%}$ Steve Wilson, 8/23 Lawrence, KS	830 (3.8) $((\sqrt{9})!)! + \dfrac{99}{.9}$ Steve Wilson, 8/23 Lawrence, KS
					836 (4.6) $\dfrac{((\sqrt{9})!)!}{.9} + (\sqrt{9})! \times (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	837 (3.4) $(99 - (\sqrt{9})!) \times 9$ Steve Wilson, 8/23 Lawrence, KS			840 (4.4) $(9 - \sqrt{9})! + \dfrac{((\sqrt{9})!)!}{(\sqrt{9})!}$ Steve Wilson, 8/23 Lawrence, KS
					846 (3.6) $\left(\dfrac{9}{9\%} - (\sqrt{9})!\right) \times 9$ Steve Wilson, 8/23 Lawrence, KS				850 (4.4) $((\sqrt{9})!)! + \dfrac{\sqrt{9} + .9}{(\sqrt{9})\%}$ Steve Wilson, 8/23 Lawrence, KS
			854 (4.2) $\dfrac{((\sqrt{9})!)!}{.9} + 9 \times (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS						860 (4.2) $\dfrac{((\sqrt{9})!)! + 9 \times (\sqrt{9})!}{.9}$ Steve Wilson, 8/23 Lawrence, KS
			864 (3.2) $(99 - \sqrt{9}) \times 9$ Steve Wilson, 8/23 Lawrence, KS						870 (4.0) $(9 - \sqrt{9})! + \dfrac{9}{(\sqrt{9})!\%}$ Steve Wilson, 8/23 Lawrence, KS
		873 (3.4) $\left(\dfrac{9}{9\%} - \sqrt{9}\right) \times 9$ Steve Wilson, 8/23 Lawrence, KS							880 (4.8) $\dfrac{.9 - (.\overline{9} + .\overline{9})\%}{.\overline{9}\pmf}$ Steve Wilson, 8/23 Lawrence, KS
881 (3.8) $\dfrac{((\sqrt{9})!)!}{.9} + 9 \times 9$ Steve Wilson, 8/23 Lawrence, KS	882 (2.0) $9 \times 99 - 9$ Dave Jones, 7/08 Coventry, England		884 (4.8) $\dfrac{.9 - .\overline{9}\%}{.\overline{9}\pmf} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	885 (3.4) $9 \times 99 - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS		887 (4.6) $\dfrac{.9 - .\overline{9}\%}{.\overline{9}\pmf} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	888 (3.2) $9 \times 99 - \sqrt{9}$ Rabeh Ghadiri, 8/08 Overland Park, KS	889 (4.8) $\dfrac{.9 - .\overline{9}\%}{.\overline{9}\pmf} - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	890 (2.4) $\dfrac{9 \times 9 - .9}{9\%}$ Steve Wilson, 5/10 Raytown, MO
891 (2.2) $9 \times \dfrac{9}{9\%} - 9$ Dave Jones, 7/08 Coventry, England	892 (2.4) $99 \times 9 + .\overline{9}$ Steve Wilson, 5/10 Raytown, MO	893 (4.6) $\dfrac{9 - .\overline{9}\%}{.\overline{9}\%} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	894 (3.2) $99 \times 9 + \sqrt{9}$ Leif Muhammad, 3/14 Kansas City, MO	895 (4.4) $\dfrac{9}{.\overline{9}\%} - (\sqrt{9})! + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	896 (4.4) $\dfrac{9 - .\overline{9}\%}{.\overline{9}\%} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	897 (3.4) $9 \times 99 + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	898 (3.4) $\dfrac{9}{.\overline{9}\%} - .\overline{9} - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	899 (2.4) $\dfrac{9 \times 9 - 9\%}{9\%}$ Dave Jones, 8/08 Coventry, England	900 (2.0) $9 \times 99 + 9$ Dave Jones, 8/08 Coventry, England
901 (2.4) $\dfrac{9}{.9\%} - 99$ Dave Jones, 8/08 Coventry, England	902 (4.2) $\dfrac{9}{.\overline{9}\%} + \sqrt{9} - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	903 (3.4) $9 \times \dfrac{9}{9\%} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	904 (4.2) $\dfrac{9}{.\overline{9}\%} + \sqrt{9} + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	905 (4.4) $\dfrac{9}{.\overline{9}\%} + (\sqrt{9})! - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	906 (3.6) $9 \times \dfrac{9}{9\%} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	907 (4.6) $\dfrac{9 + .\overline{9}\%}{.\overline{9}\%} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	908 (3.0) $\dfrac{9}{.\overline{9}\%} + 9 - .\overline{9}$ Steve Wilson, 5/10 Raytown, MO	909 (2.2) $9 \times \dfrac{9}{9\%} + 9$ Dave Jones, 8/08 Coventry, England	910 (2.4) $\dfrac{9 \times 9 + .9}{9\%}$ Dave Jones, 8/08 Coventry, England
911 (4.8) $\dfrac{.9 + .\overline{9}\%}{.\overline{9}\pmf} + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	912 (3.8) $\dfrac{9}{.\overline{9}\%} + 9 + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	913 (4.6) $\dfrac{.9 + .\overline{9}\%}{.\overline{9}\pmf} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS		915 (4.0) $\dfrac{9}{.\overline{9}\%} + 9 + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	916 (4.8) $\dfrac{.9 + .\overline{9}\%}{.\overline{9}\pmf} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS		918 (2.6) $\dfrac{9}{.\overline{9}\%} + 9 + 9$ Steve Wilson, 6/10 Raytown, MO	919 (2.4) $\dfrac{9}{.9\%} - 9 \times 9$ Dave Jones, 9/08 Coventry, England	920 (3.8) $((\sqrt{9})!)! + \dfrac{9 + 9}{9\%}$ Steve Wilson, 8/23 Lawrence, KS
						927 (3.4) $\left(\dfrac{9}{9\%} + \sqrt{9}\right) \times 9$ Steve Wilson, 8/23 Lawrence, KS			930 (4.0) $\dfrac{9}{.\overline{9}\%} - \dfrac{9}{\sqrt{9\%}}$ Steve Wilson, 8/23 Lawrence, KS
					936 (4.4) $\dfrac{9}{.\overline{9}\%} + (\sqrt{9})! \times (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS				940 (3.8) $\dfrac{9 - 9\% \times (\sqrt{9})!}{9\pmf}$ Steve Wilson, 8/23 Lawrence, KS
941 (4.4) $\dfrac{(\sqrt{9})! - \sqrt{9\%}}{(\sqrt{9})!\pmf} - 9$ Steve Wilson, 8/23 Lawrence, KS			944 (4.8) $\dfrac{(\sqrt{9})! - \sqrt{9\%}}{(\sqrt{9})!\pmf} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	945 (3.4) $(99 + (\sqrt{9})!) \times 9$ Steve Wilson, 8/23 Lawrence, KS	946 (3.6) $\dfrac{9}{9\pmf} - 9 \times (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	947 (4.6) $\dfrac{(\sqrt{9})! - \sqrt{9\%}}{(\sqrt{9})!\pmf} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS		949 (4.8) $\dfrac{(\sqrt{9})! - \sqrt{9\%}}{(\sqrt{9})!\pmf} - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	950 (4.2) $\dfrac{9 - \sqrt{9} - \sqrt{9\%}}{(\sqrt{9})!\pmf}$ Steve Wilson, 8/23 Lawrence, KS
951 (4.8) $\dfrac{(\sqrt{9})! - \sqrt{9\%}}{(\sqrt{9})!\pmf} + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS		953 (4.6) $\dfrac{(\sqrt{9})! - \sqrt{9\%}}{(\sqrt{9})!\pmf} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	954 (3.6) $\left(\dfrac{9}{9\%} + (\sqrt{9})!\right) \times 9$ Steve Wilson, 8/23 Lawrence, KS		956 (4.8) $\dfrac{(\sqrt{9})! - \sqrt{9\%}}{(\sqrt{9})!\pmf} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			959 (4.4) $\dfrac{(\sqrt{9})! - \sqrt{9\%}}{(\sqrt{9})!\pmf} + 9$ Steve Wilson, 8/23 Lawrence, KS	960 (4.0) $\dfrac{9.9 - \sqrt{9\%}}{.\overline{9}\%}$ Steve Wilson, 8/23 Lawrence, KS
			964 (4.0) $\dfrac{9}{9\pmf} - (\sqrt{9})! \times (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS						970 (3.6) $\dfrac{9 - 9\% \times \sqrt{9}}{9\pmf}$ Steve Wilson, 8/23 Lawrence, KS
	972 (2.0) $(99 + 9) \times 9$ Dave Jones, 9/08 Coventry, England	973 (3.4) $\dfrac{9}{9\pmf} - 9 \times \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS							980 (2.6) $\dfrac{9 - (9 + 9)\%}{.9\%}$ Steve Wilson, 6/10 Raytown, MO
981 (2.2) $9 \times \left( \dfrac{9}{9\%} + 9 \right)$ Dave Jones, 9/08 Coventry, England	982 (2.4) $\dfrac{9}{.9\%} - 9 - 9$ Dave Jones, 9/08 Coventry, England		984 (3.8) $\dfrac{9 - 9\%}{9\pmf} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	985 (3.6) $\dfrac{9}{9\pmf} - 9 - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS		987 (3.6) $\dfrac{9 - 9\%}{9\pmf} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	988 (3.4) $\dfrac{9}{9\pmf} - 9 - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	989 (2.6) $\dfrac{9 - 9.9\%}{.9\%}$ Dave Jones, 11/08 Coventry, England	990 (2.0) $999 - 9$ Dave Jones, 10/08 Coventry, England
991 (2.8) $\dfrac{9}{.9\%} - 9 \times .\overline{9}$ Steve Wilson, 2/09 Raytown, MO	992 (2.8) $\dfrac{9}{.9\%} - 9 + .\overline{9}$ Steve Wilson, 2/09 Raytown, MO	993 (3.4) $999 - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	994 (3.4) $\dfrac{9}{9\pmf} - 9 + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	995 (4.0) $\dfrac{9}{9\pmf} - (\sqrt{9})! + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	996 (3.2) $999 - \sqrt{9}$ Parker Moss, 9/12 Overland Park, KS	997 (3.4) $\dfrac{9}{9\pmf} - \dfrac{9}{\sqrt{9}}$ Steve Wilson, 8/23 Lawrence, KS	998 (2.4) $999 - .\overline{9}$ Steve Wilson, 6/10 Raytown, MO	999 (2.4) $\dfrac{9}{.9\%} - \dfrac99$ Steve Wilson, 2/09 Raytown, MO	1000 (2.2) $\dfrac{99}{9.9\%}$ Dave Jones, 10/08 Coventry, England
1001 (2.4) $\dfrac{9}{.9\%} + \dfrac99$ Dave Jones, 10/08 Coventry, England	1002 (3.0) $\dfrac{9 + (.9 + .9)\%}{.9\%}$ Steve Wilson, 6/10 Raytown, MO	1003 (3.4) $\dfrac{9}{9\pmf} + \dfrac{9}{\sqrt{9}}$ Steve Wilson, 8/23 Lawrence, KS	1004 (3.8) $\dfrac{9 + 9\%}{9\pmf} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	1005 (3.4) $999 + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	1006 (3.4) $\dfrac{9}{9\pmf} + 9 - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	1007 (3.6) $\dfrac{9 + 9\%}{9\pmf} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	1008 (2.0) $999 + 9$ Jeremy Miller, 11/07 Olathe, KS	1009 (2.8) $\dfrac{9 + 9 \times .9\%}{.9\%}$ Steve Wilson, 6/10 Raytown, MO	1010 (2.6) $\dfrac{9}{.9\%} + 9.\overline{9}$ Steve Wilson, 2/09 Raytown, MO
1011 (2.6) $\dfrac{9 + 9.9\%}{.9\%}$ Dave Jones, 10/08 Coventry, England	1012 (3.4) $\dfrac{9}{9\pmf} + 9 + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS	1013 (3.6) $\dfrac{9 + 9\%}{9\pmf} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS		1015 (3.6) $\dfrac{9}{9\pmf} + 9 + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS	1016 (3.8) $\dfrac{9 + 9\%}{9\pmf} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS		1018 (2.4) $\dfrac{9}{.9\%} + 9 + 9$ Dave Jones, 10/08 Coventry, England	1019 (2.6) $\dfrac{9 + 9\%}{.9\%} + 9$ Dave Jones, 11/08 Coventry, England	1020 (2.6) $\dfrac{9 + (9+9)\%}{.9\%}$ Dave Jones, 11/08 Coventry, England
						1027 (3.4) $\dfrac{9}{9\pmf} + 9 \times \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS			1030 (3.6) $\dfrac{9 + 9\% \times \sqrt{9}}{9\pmf}$ Steve Wilson, 8/23 Lawrence, KS
					1036 (4.0) $\dfrac{9}{9\pmf} + (\sqrt{9})! \times (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS
									1050 (4.2) $\dfrac{9 - \sqrt{9} + \sqrt{9\%}}{(\sqrt{9})!\pmf}$ Steve Wilson, 8/23 Lawrence, KS
			1054 (3.6) $\dfrac{9}{9\pmf} + 9 \times (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS						1060 (3.8) $\dfrac{9 + 9\% \times (\sqrt{9})!}{9\pmf}$ Steve Wilson, 8/23 Lawrence, KS
	1062 (4.8) $9 \times (99 - \coth\ln\sqrt{.9})$ Steve Wilson, 8/23 Lawrence, KS
									1080 (2.8) $\dfrac{9.9 + .9}{.\overline{9}\%}$ Steve Wilson, 10/11 Raytown, MO
1081 (2.4) $\dfrac{9}{.9\%} + 9 \times 9$ Dave Jones, 11/08 Coventry, England								1089 (4.8) $99 \times (9 - \log(.\overline{9}\%))$ Steve Wilson, 8/23 Lawrence, KS	1090 (2.4) $\dfrac{99 - .9}{9\%}$ Dave Jones, 11/08 Coventry, England
1091 (2.2) $\dfrac{99}{9\%} - 9$ Amy Koger, 9/08 Fort Scott, KS			1094 (3.6) $\dfrac{99}{9\%} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			1097 (3.4) $\dfrac{99}{9\%} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS		1099 (2.4) $\dfrac{9}{.9\%} + 99$ Dave Jones, 12/08 Coventry, England	1100 (2.6) $\dfrac{99}{9\%} \times .\overline{9}$ Steve Wilson, 2/09 Raytown, MO
1101 (2.4) $\dfrac{99 + 9\%}{9\%}$ Dave Jones, 12/08 Coventry, England		1103 (3.4) $\dfrac{99}{9\%} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS			1106 (3.6) $\dfrac{99}{9\%} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			1109 (2.2) $\dfrac{99}{9\%} + 9$ Amy Koger, 9/08 Fort Scott, KS	1110 (2.2) $\dfrac{999}{.9}$ Dave Jones, 12/08 Coventry, England
1111 (2.8) $\dfrac{9 - 9\%\%}{9\% \times 9\%}$ Steve Wilson, 10/11 Raytown, MO					1116 (3.0) $\dfrac{.9}{(9 - .\overline{9})\%\%} - 9$ Steve Wilson, 10/11 Raytown, MO			1119 (4.0) $\dfrac{9}{(9 - .\overline{9})\pmf} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS
	1122 (3.8) $\dfrac{9}{(9 - .\overline{9})\pmf} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS		1124 (3.4) $\dfrac{.9}{(9 - .\overline{9})\%\%} - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	1125 (2.6) $\dfrac{9}{\left(.9 - \dfrac{.9}{9}\right)\%}$ Steve Wilson, 8/23 Lawrence, KS	1126 (3.4) $\dfrac{.9}{(9 - .\overline{9})\%\%} + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS		1128 (3.8) $\dfrac{9}{(9 - .\overline{9})\pmf} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS
1131 (4.0) $\dfrac{9}{(9 - .\overline{9})\pmf} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			1134 (3.0) $\dfrac{.9}{(9 - .\overline{9})\%\%} + 9$ Steve Wilson, 10/11 Raytown, MO
							1188 (3.2) $99 \times (9 + \sqrt{9})$ Steve Wilson, 8/23 Lawrence, KS		1190 (4.8) $\dfrac{.9 + \sqrt{9\%} - .\overline{9}\%}{.\overline{9}\pmf}$ Steve Wilson, 8/23 Lawrence, KS
1191 (3.8) $\dfrac{9 + \sqrt{9}}{.\overline{9}\%} - 9$ Steve Wilson, 8/23 Lawrence, KS			1194 (4.2) $\dfrac{9 + \sqrt{9}}{.\overline{9}\%} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			1197 (4.0) $\dfrac{9 + \sqrt{9}}{.\overline{9}\%} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS		1199 (4.2) $\dfrac{9 + \sqrt{9}}{.\overline{9}\%} - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	1200 (2.2) $\dfrac{99 + 9}{9\%}$ Dave Jones, 12/08 Coventry, England
1201 (4.2) $\dfrac{9 + \sqrt{9}}{.\overline{9}\%} + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS		1203 (4.0) $\dfrac{9 + \sqrt{9}}{.\overline{9}\%} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS			1206 (4.2) $\dfrac{9 + \sqrt{9}}{.\overline{9}\%} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			1209 (3.8) $\dfrac{9 + \sqrt{9}}{.\overline{9}\%} + 9$ Steve Wilson, 8/23 Lawrence, KS	1210 (4.8) $\dfrac{.9 + \sqrt{9\%} + .\overline{9}\%}{.\overline{9}\pmf}$ Steve Wilson, 8/23 Lawrence, KS
									1220 (3.8) $((\sqrt{9})!)! + \dfrac{9}{(9 + 9)\pmf}$ Steve Wilson, 8/23 Lawrence, KS
1241 (3.2) $\dfrac{.\overline{9}}{(9 - .\overline{9})\%\%} - 9$ Steve Wilson, 8/23 Lawrence, KS			1244 (4.6) $\dfrac{.\overline{9}}{(9 - .\overline{9})\%\%} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			1247 (4.4) $\dfrac{.\overline{9}}{(9 - .\overline{9})\%\%} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS		1249 (3.6) $\dfrac{.\overline{9}}{(9 - .\overline{9})\%\%} - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	1250 (2.4) $\dfrac{9}{(9 \times 9 - 9)\%\%}$ Steve Wilson, 10/11 Raytown, MO
1251 (3.6) $\dfrac{.\overline{9}}{(9 - .\overline{9})\%\%} + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS		1253 (4.4) $\dfrac{.\overline{9}}{(9 - .\overline{9})\%\%} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS			1256 (4.6) $\dfrac{.\overline{9}}{(9 - .\overline{9})\%\%} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			1259 (3.2) $\dfrac{.\overline{9}}{(9 - .\overline{9})\%\%} + 9$ Steve Wilson, 8/23 Lawrence, KS
									1280 (3.8) $\dfrac{9 + 9}{9\pmf} - ((\sqrt{9})!)!$ Steve Wilson, 8/23 Lawrence, KS
							1458 (1.0) $(9 + 9) \times 9 \times 9$ Levi Self, 5/08 San Antonio, TX
				1485 (3.4) $99 \times (9 + (\sqrt{9})!)$ Steve Wilson, 8/23 Lawrence, KS
1491 (4.0) $\dfrac{9 + (\sqrt{9})!}{.\overline{9}\%} - 9$ Steve Wilson, 8/23 Lawrence, KS			1494 (4.4) $\dfrac{9 + (\sqrt{9})!}{.\overline{9}\%} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			1497 (4.2) $\dfrac{9 + (\sqrt{9})!}{.\overline{9}\%} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS		1499 (4.4) $\dfrac{9 + (\sqrt{9})!}{.\overline{9}\%} - .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS	1500 (3.6) $\dfrac{9}{9\%} \times (9 + (\sqrt{9})!)$ Steve Wilson, 8/23 Lawrence, KS
1501 (4.4) $\dfrac{9 + (\sqrt{9})!}{.\overline{9}\%} + .\overline{9}$ Steve Wilson, 8/23 Lawrence, KS		1503 (4.2) $\dfrac{9 + (\sqrt{9})!}{.\overline{9}\%} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS			1506 (4.4) $\dfrac{9 + (\sqrt{9})!}{.\overline{9}\%} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			1509 (4.0) $\dfrac{9 + (\sqrt{9})!}{.\overline{9}\%} + 9$ Steve Wilson, 8/23 Lawrence, KS
							1548 (4.8) $9 - \dfrac{9 \times 9}{\tanh\ln\sqrt{.9}}$ Steve Wilson, 8/23 Lawrence, KS
									1620 (2.8) $(9 + 9) \times \dfrac{.9}{.\overline{9}\%}$ Steve Wilson, 10/11 Raytown, MO
									1700 (3.0) $\dfrac{9 + 9 - .\overline{9}}{.\overline{9}\%}$ Steve Wilson, 10/11 Raytown, MO
									1710 (2.8) $\dfrac{9 + 9 \times .9}{.\overline{9}\%}$ Steve Wilson, 10/11 Raytown, MO
	1782 (2.0) $(9 + 9) \times 99$ Dave Jones, 1/09 Coventry, England
									1790 (4.6) $\dfrac{.9 + .9 - .\overline{9}\%}{.\overline{9}\pmf}$ Steve Wilson, 8/23 Lawrence, KS
1791 (2.6) $\dfrac{9 + 9}{.\overline{9}\%} - 9$ Steve Wilson, 10/11 Raytown, MO			1794 (4.0) $\dfrac{9 + 9}{.\overline{9}\%} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			1797 (3.8) $\dfrac{9 + 9}{.\overline{9}\%} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS		1799 (3.0) $\dfrac{9 + 9}{.\overline{9}\%} - .\overline{9}$ Steve Wilson, 10/11 Raytown, MO	1800 (2.2) $(9 + 9) \times \dfrac{9}{9\%}$ Dave Jones, 1/09 Coventry, England
1801 (3.0) $\dfrac{9 + 9}{.\overline{9}\%} + .\overline{9}$ Steve Wilson, 11/11 Raytown, MO		1803 (3.8) $\dfrac{9 + 9}{.\overline{9}\%} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS			1806 (4.0) $\dfrac{9 + 9}{.\overline{9}\%} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			1809 (2.6) $\dfrac{9 + 9}{.\overline{9}\%} + 9$ Steve Wilson, 11/11 Raytown, MO	1810 (4.6) $\dfrac{.9 + .9 + .\overline{9}\%}{.\overline{9}\pmf}$ Steve Wilson, 8/23 Lawrence, KS
									1890 (2.6) $\dfrac{9.9 + 9}{.\overline{9}\%}$ Steve Wilson, 11/11 Raytown, MO
									1900 (2.6) $\dfrac{9 + 9 - .9}{.9\%}$ Dave Jones, 1/09 Coventry, England
									1990 (2.6) $\dfrac{9 + 9 - 9\%}{.9\%}$ Dave Jones, 1/09 Coventry, England
1991 (2.4) $\dfrac{9 + 9}{.9\%} - 9$ Dave Jones, 1/09 Coventry, England			1994 (3.6) $\dfrac{9 + 9}{9\pmf} - (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			1997 (3.4) $\dfrac{9 + 9}{9\pmf} - \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS		1999 (2.8) $\dfrac{9 + 9 - .9\%}{.9\%}$ Steve Wilson, 11/11 Raytown, MO	2000 (2.8) $\dfrac{9}{.9\%} + \dfrac{9}{.9\%}$ Dave Jones, 2/09 Coventry, England
2001 (2.8) $\dfrac{9 + 9 + .9\%}{.9\%}$ Steve Wilson, 11/11 Raytown, MO		2003 (3.4) $\dfrac{9 + 9}{9\pmf} + \sqrt{9}$ Steve Wilson, 8/23 Lawrence, KS			2006 (3.6) $\dfrac{9 + 9}{9\pmf} + (\sqrt{9})!$ Steve Wilson, 8/23 Lawrence, KS			2009 (2.4) $\dfrac{9 + 9}{.9\%} + 9$ Dave Jones, 2/09 Coventry, England	2010 (2.6) $\dfrac{9 + 9 + 9\%}{.9\%}$ Dave Jones, 2/09 Coventry, England
									2100 (2.4) $\dfrac{9.9 + 9}{.9\%}$ Dave Jones, 2/09 Coventry, England
						2187 (3.2) $9 \times 9 \times 9 \times \sqrt{9}$ Harman Tiwana, 10/12 Lenexa, KS
		2673 (3.2) $99 \times 9 \times \sqrt{9}$ Zach Warring, 11/09 Olathe, Kansas
									2700 (2.6) $\dfrac{9 + 9 + 9}{.\overline{9}\%}$ Steve Wilson, 11/11 Raytown, MO
									3000 (2.4) $\dfrac{9 + 9 + 9}{.9\%}$ Dave Jones, 2/09 Coventry, England
									4050 (3.0) $\dfrac{9 \times 9}{(.\overline{9} + .\overline{9})\%}$ Steve Wilson, 11/11 Raytown, MO
4471 (3.2) $\dfrac{9!}{9 \times 9} - 9$ Zach Warring, 11/09 Olathe, Kansas
								4489 (3.2) $\dfrac{9!}{9 \times 9} + 9$ Zach Warring, 11/09 Olathe, Kansas
									4500 (2.6) $\dfrac{9}{(.9 + .9)\%} \times 9$ Dave Jones, 4/09 Coventry, England
									5500 (2.6) $\dfrac{99}{(.9 + .9)\%}$ Dave Jones, 4/09 Coventry, England
	6552 (3.2) $9^{\sqrt{9}} \times 9 - 9$ Chelsea Kiddle, 11/12 Leawood, KS
6561 (1.0) $9 \times 9 \times 9 \times 9$ Jeremy Miller, 11/07 Olathe, KS									6570 (3.2) $9^{\sqrt{9}} \times 9 + 9$ Chelsea Kiddle, 11/12 Leawood, KS
									8000 (2.4) $\dfrac{9 \times 9 - 9}{.9\%}$ Dave Jones, 4/09 Coventry, England
								8019 (2.0) $99 \times 9 \times 9$ Dave Jones, 4/09 Coventry, England
									8100 (2.2) $9 \times 9 \times \dfrac{9}{9\%}$ Dave Jones, 4/09 Coventry, England
8991 (2.0) $999 \times 9$ Regina Hillman, 12/07 Bucyrus, KS
9801 (2.0) $99 \times 99$ Brooke Atkinson, 4/09 Olathe, KS
13431 (3.4) $\dfrac{9!}{9 \times \sqrt{9}} - 9$ Zach Warring, 11/09 Olathe, Kansas									13440 (3.4) $\dfrac{9!}{9} \times \dfrac{\sqrt{9}}{9}$ Tyler Cox, 12/09 Olathe, Kansas
								13449 (3.4) $\dfrac{9!}{9 \times \sqrt{9}} + 9$ Zach Warring, 11/09 Olathe, Kansas
									40320 (3.2) $\dfrac{9!}{9} \times \dfrac99$ Rabeh Ghadiri, 12/08 Overland Park, KS
40401 (3.2) $\dfrac{9!}{9} + 9 \times 9$ Chad Ojeda, 9/08 Overland Park, KS
									44800 (3.4) $\dfrac{ \dfrac{9!}{9} + 9!}{9}$ Nicole Bunch, 2/09 Kansas City, MO
									241920 (3.6) $(\sqrt{9} + \sqrt{9}) \times \dfrac{9!}{9}$ Rabeh Ghadiri, 11/08 Overland Park, KS
		362853 (3.2) $9! - 9 - 9 - 9$ Nicole Bunch, 2/09 Kansas City, MO
362871 (3.2) $9! + 9 - 9 - 9$ Nicole Bunch, 2/09 Kansas City, MO
362881 (3.2) $\dfrac{9! \times 9 + 9}{9}$ Rabeh Ghadiri, 10/08 Overland Park, KS								362889 (3.2) $9! + 9 \times \dfrac99$ Nicole Bunch, 2/09 Kansas City, MO
									403200 (3.4) $\dfrac{9! \times 9 + 9!}{9}$ Nicole Bunch, 2/09 Kansas City, MO
									3265920 (3.2) $9! \times 9 \times \dfrac99$ Nicole Bunch, 2/09 Kansas City, MO
3628791 (3.2) $9! \times 9 + 9! - 9$ Nicole Bunch, 2/09 Kansas City, MO
						14348907 (3.2) $\dfrac{9^9}{9 \times \sqrt{9}}$ Chad Ojeda, 9/08 Overland Park, KS
							32332608 (3.4) $99 \times .9 \times 9!$ Nicole Bunch, 2/09 Kansas City, MO
	32651712 (3.2) $99.9 \times 9!$ Nicole Bunch, 2/09 Kansas City, MO
									32659200 (3.4) $(9! \times 9 + 9!) \times 9$ Nicole Bunch, 2/09 Kansas City, MO
	43046712 (3.0) $\dfrac{9^9}{9} - 9$ Kashmira Sayani, 1/17 Overland Park, KS
									387420390 (3.0) $9^9 - 99$ Kashmira Sayani, 4/17 Overland Park, KS
							387420408 (3.0) $9^9 - 9 \times 9$ Lisa Fisher, 7/09 Lawrence, KS
									387420570 (3.0) $9^9 + 9 \times 9$ Lisa Fisher, 7/09 Lawrence, KS
							387420588 (3.0) $9^9 + 99$ Lisa Fisher, 7/09 Lawrence, KS
		129140163 (3.2) $9^9 \times \dfrac{\sqrt{9}}{9}$ Tyler Cox, 12/09 Olathe, Kansas
						1162261467 (3.2) $9^9 \times \dfrac{9}{\sqrt{9}}$ Chad Ojeda, 9/08 Overland Park, KS
									googol (3.4) $\left( \dfrac{9}{.9} \right) ^{9/(9\%)}$ Paolo Pellegrini, 5/08 Martina Franca, Italy
									googolplex (4.4) $9.\overline{9}^{\left( \sqrt[-(\sqrt{9})\%]{ .\overline{9}\pmf} \right)}$ Ralph Jeffords, 3/09 Centreville, VA

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