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range of sqrt(1-x^2)
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range\:\sqrt{1-x^{2}}
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extreme points of f(x)=-x^3+5x^2+8x-3
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extreme\:points\:f(x)=-x^{3}+5x^{2}+8x-3
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parity f(x)=3^x-5
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parity\:f(x)=3^{x}-5
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range of 3x-8
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range\:3x-8
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critical points of cos(3x)
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critical\:points\:\cos(3x)
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line y-70.75=0.11(x-250)
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line\:y-70.75=0.11(x-250)
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asymptotes of f(x)=(x^2-4)/(x^2-3x+2)
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asymptotes\:f(x)=\frac{x^{2}-4}{x^{2}-3x+2}
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midpoint (5,2)(-6,-3)
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midpoint\:(5,2)(-6,-3)
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extreme points of f(x)=(x+5)^{4/5}
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extreme\:points\:f(x)=(x+5)^{\frac{4}{5}}
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intercepts of-1/5 3^x-2
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intercepts\:-\frac{1}{5}3^{x}-2
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asymptotes of f(x)=(10x^2)/(5x^2+2)
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asymptotes\:f(x)=\frac{10x^{2}}{5x^{2}+2}
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inverse of f(x)= 2/(3-x)
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inverse\:f(x)=\frac{2}{3-x}
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inverse of f(x)=(x-8)^3
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inverse\:f(x)=(x-8)^{3}
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inverse of f(x)= 5/3 x+10/3
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inverse\:f(x)=\frac{5}{3}x+\frac{10}{3}
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intercepts of f(x)=x^3-10x^2+29x-20
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intercepts\:f(x)=x^{3}-10x^{2}+29x-20
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domain of f(x)=sqrt(2x-62)
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domain\:f(x)=\sqrt{2x-62}
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parity f(x)=x^2+2x-5
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parity\:f(x)=x^{2}+2x-5
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intercepts of f(x)=(2x+5)/(2x-16)
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intercepts\:f(x)=\frac{2x+5}{2x-16}
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critical points of 3^x-2^x
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critical\:points\:3^{x}-2^{x}
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inverse of x^2-8x+7
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inverse\:x^{2}-8x+7
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range of-x+4
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range\:-x+4
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inverse of f(x)=-9sqrt(x-8)+5
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inverse\:f(x)=-9\sqrt{x-8}+5
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f(x)=log_{1/2}(x)
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f(x)=\log_{\frac{1}{2}}(x)
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domain of f(x)=x^2-x+1
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domain\:f(x)=x^{2}-x+1
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distance (-4,3),(2,-5)
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distance\:(-4,3),(2,-5)
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parallel y-3x=1
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parallel\:y-3x=1
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slope of 1/(x-3),x=7
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slope\:\frac{1}{x-3},x=7
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domain of ((x/(x+4)))/((x^3))
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domain\:\frac{(\frac{x}{x+4})}{(x^{3})}
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domain of-x+4
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domain\:-x+4
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inverse of f(x)= 1/3 x^2-9
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inverse\:f(x)=\frac{1}{3}x^{2}-9
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domain of y=(cos(x))/(2+sin(x))
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domain\:y=\frac{\cos(x)}{2+\sin(x)}
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domain of f(x)= x/(2x^2-5)-sqrt(x)
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domain\:f(x)=\frac{x}{2x^{2}-5}-\sqrt{x}
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inverse of-3cos(5x)
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inverse\:-3\cos(5x)
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asymptotes of (x^2+4x+7)/(x+3)
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asymptotes\:\frac{x^{2}+4x+7}{x+3}
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inverse of f(x)=sqrt(7-x)+5
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inverse\:f(x)=\sqrt{7-x}+5
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inverse of f(x)=-8x^2+4x>= 0
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inverse\:f(x)=-8x^{2}+4x\ge\:0
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line y=2
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line\:y=2
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parallel x+2y=6
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parallel\:x+2y=6
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inverse of f(x)=(x-4)/(x+4)
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inverse\:f(x)=\frac{x-4}{x+4}
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critical points of sqrt(x^2+7)
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critical\:points\:\sqrt{x^{2}+7}
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range of sqrt((4x+3)/(2x+5))
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range\:\sqrt{\frac{4x+3}{2x+5}}
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range of f(x)= 1/(1-sqrt(x-2))
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range\:f(x)=\frac{1}{1-\sqrt{x-2}}
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domain of f(x)=(x+9)/(x^2+10x+9)
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domain\:f(x)=\frac{x+9}{x^{2}+10x+9}
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domain of sqrt(16-x^2)-sqrt(x+3)
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domain\:\sqrt{16-x^{2}}-\sqrt{x+3}
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asymptotes of f(x)=-3/(x^2-4)
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asymptotes\:f(x)=-\frac{3}{x^{2}-4}
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asymptotes of (x^3-2x^2-3x)/(x-3)
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asymptotes\:\frac{x^{3}-2x^{2}-3x}{x-3}
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range of y=|x-3|
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range\:y=|x-3|
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asymptotes of f(x)=(3x-12)/(x^2-3x-4)
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asymptotes\:f(x)=\frac{3x-12}{x^{2}-3x-4}
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asymptotes of 1/2 x^2+2
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asymptotes\:\frac{1}{2}x^{2}+2
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extreme points of f(x)=x^3-3x^2+4
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extreme\:points\:f(x)=x^{3}-3x^{2}+4
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slope intercept of y=2x+12
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slope\:intercept\:y=2x+12
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domain of f(x)=-3<= x<= 2
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domain\:f(x)=-3\le\:x\le\:2
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slope of 5x+2y=2
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slope\:5x+2y=2
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intercepts of f(x)=x^3-3x+2
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intercepts\:f(x)=x^{3}-3x+2
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inverse of 1-2/(x+3)
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inverse\:1-\frac{2}{x+3}
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midpoint (1,4)(-9,2)
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midpoint\:(1,4)(-9,2)
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domain of f(x)=sqrt(x-4)
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domain\:f(x)=\sqrt{x-4}
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domain of f(x)=(2x)/((x+2)(x-3))
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domain\:f(x)=\frac{2x}{(x+2)(x-3)}
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domain of f(x)= 6/(x^2-4)
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domain\:f(x)=\frac{6}{x^{2}-4}
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domain of \sqrt[3]{x^3-4}
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domain\:\sqrt[3]{x^{3}-4}
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inverse of (x-3)/(2x+5)
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inverse\:\frac{x-3}{2x+5}
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line y= 5/6 x-9/2
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line\:y=\frac{5}{6}x-\frac{9}{2}
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monotone intervals f(x)=0.05x+15+(500)/x
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monotone\:intervals\:f(x)=0.05x+15+\frac{500}{x}
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domain of ln(x)+2
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domain\:\ln(x)+2
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inverse of \sqrt[3]{((x+3))/2}
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inverse\:\sqrt[3]{\frac{(x+3)}{2}}
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amplitude of 2sin((2pitheta)/3)
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amplitude\:2\sin(\frac{2\pi\theta}{3})
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f(x)=x^2+2x
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f(x)=x^{2}+2x
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extreme points of f(x)=-x^{2/3}(x-2)
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extreme\:points\:f(x)=-x^{\frac{2}{3}}(x-2)
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range of f(x)=sqrt(x-3)+4
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range\:f(x)=\sqrt{x-3}+4
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inverse of y=32^{x-4}
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inverse\:y=32^{x-4}
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inflection points of f(x)=12x^2-16
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inflection\:points\:f(x)=12x^{2}-16
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domain of f(x)=(x^3)/(x^2+1)
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domain\:f(x)=\frac{x^{3}}{x^{2}+1}
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midpoint (0,-1)(2,1)
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midpoint\:(0,-1)(2,1)
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intercepts of y=2x+3
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intercepts\:y=2x+3
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asymptotes of (x^2+7x+6)/(x-1)
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asymptotes\:\frac{x^{2}+7x+6}{x-1}
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domain of 4x-1
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domain\:4x-1
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parity f(x)=\sqrt[3]{5x}
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parity\:f(x)=\sqrt[3]{5x}
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symmetry y=-(x-4)^2-1
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symmetry\:y=-(x-4)^{2}-1
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line m=-8,\at (-4,9)
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line\:m=-8,\at\:(-4,9)
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domain of sqrt((5-x)/x)
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domain\:\sqrt{\frac{5-x}{x}}
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asymptotes of f(x)= x/(x^3-x)
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asymptotes\:f(x)=\frac{x}{x^{3}-x}
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extreme points of f(x)=4(x-8)^{2/3}+2
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extreme\:points\:f(x)=4(x-8)^{\frac{2}{3}}+2
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symmetry f(x)=-1/2 (x+3)^2+2
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symmetry\:f(x)=-\frac{1}{2}(x+3)^{2}+2
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inverse of f(x)=((x+1))/((4x+1))
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inverse\:f(x)=\frac{(x+1)}{(4x+1)}
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critical points of e^{-0.5x^2}
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critical\:points\:e^{-0.5x^{2}}
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inverse of f(x)=4x^2+1
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inverse\:f(x)=4x^{2}+1
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inverse of f(x)=(3x+4)/(5-4x)
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inverse\:f(x)=\frac{3x+4}{5-4x}
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perpendicular x-4=0
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perpendicular\:x-4=0
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f(x)=x^3-1
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f(x)=x^{3}-1
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distance (2,4)(6,8)
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distance\:(2,4)(6,8)
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inverse of y=log_{2}(x)+5
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inverse\:y=\log_{2}(x)+5
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critical points of f(x)=3x^2-3
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critical\:points\:f(x)=3x^{2}-3
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monotone intervals f(x)=x^4-8x+16
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monotone\:intervals\:f(x)=x^{4}-8x+16
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asymptotes of ((x+1))/((x+2)(x-3))
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asymptotes\:\frac{(x+1)}{(x+2)(x-3)}
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inverse of f(x)=(2x+1)/(3x)
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inverse\:f(x)=\frac{2x+1}{3x}
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perpendicular y=x,\at (6,1)
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perpendicular\:y=x,\at\:(6,1)
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intercepts of f(x)=3y+2x=-x+5
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intercepts\:f(x)=3y+2x=-x+5
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asymptotes of f(x)=((2x)/(x+2))
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asymptotes\:f(x)=(\frac{2x}{x+2})
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domain of (x^3)/(x^2+3x-10)
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domain\:\frac{x^{3}}{x^{2}+3x-10}
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domain of 3/x
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domain\:\frac{3}{x}
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