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Popular Functions & Graphing Problems
domain of f(x)=sqrt(5x-30)
domain\:f(x)=\sqrt{5x-30}
distance (2,-7),(9,-2)
distance\:(2,-7),(9,-2)
critical points of f(x)=t^4-16t^3+64t^2
critical\:points\:f(x)=t^{4}-16t^{3}+64t^{2}
inverse of f(x)=log_{5}(x^3)
inverse\:f(x)=\log_{5}(x^{3})
line (-2,3)(4,5)
line\:(-2,3)(4,5)
critical points of f(x)=2.6+2.2x-0.6x^2
critical\:points\:f(x)=2.6+2.2x-0.6x^{2}
line (4,10)(12,18)
line\:(4,10)(12,18)
critical points of f(x)=xsqrt(16-x^2)
critical\:points\:f(x)=x\sqrt{16-x^{2}}
range of 5ln(x)
range\:5\ln(x)
critical points of f(x)=x^4-162x^2+6561
critical\:points\:f(x)=x^{4}-162x^{2}+6561
slope of a
slope\:a
distance (-10,7)(2,5)
distance\:(-10,7)(2,5)
critical points of f(x)= 4/(x^2+8)
critical\:points\:f(x)=\frac{4}{x^{2}+8}
inverse of f(x)=(x-2)/(3x+1)
inverse\:f(x)=\frac{x-2}{3x+1}
inflection points of f(x)= x/(x^2-1)
inflection\:points\:f(x)=\frac{x}{x^{2}-1}
inflection points of f(x)=((x^2+1))/x
inflection\:points\:f(x)=\frac{(x^{2}+1)}{x}
inflection points of f(x)=x^3-6x^2+12x-8
inflection\:points\:f(x)=x^{3}-6x^{2}+12x-8
inverse of f(x)=3x+3
inverse\:f(x)=3x+3
domain of f(x)=(4x+5)/(x^2-x+1)
domain\:f(x)=\frac{4x+5}{x^{2}-x+1}
range of 5+(6+x)^{1/2}
range\:5+(6+x)^{\frac{1}{2}}
domain of f(x)=2xsqrt(x)^3
domain\:f(x)=2x\sqrt{x}^{3}
distance (-4,-5)(2,7)
distance\:(-4,-5)(2,7)
inverse of x^2-3x+2
inverse\:x^{2}-3x+2
inverse of sqrt(16x-48)-3
inverse\:\sqrt{16x-48}-3
critical points of (x^2-2x+4)/(x-2)
critical\:points\:\frac{x^{2}-2x+4}{x-2}
domain of g(t)=-3/(2t^{3/2)}
domain\:g(t)=-\frac{3}{2t^{\frac{3}{2}}}
domain of f(x)=-2^x+100
domain\:f(x)=-2^{x}+100
domain of (x^2-4)/(x-2)
domain\:\frac{x^{2}-4}{x-2}
intercepts of f(x)=(-5x+5)/(3x+7)
intercepts\:f(x)=\frac{-5x+5}{3x+7}
domain of f(x)= 1/(|x+3|)
domain\:f(x)=\frac{1}{|x+3|}
domain of 1/(1-x)
domain\:\frac{1}{1-x}
domain of f(x)=3x\div sqrt(5-x)
domain\:f(x)=3x\div\:\sqrt{5-x}
line-5,-2
line\:-5,-2
perpendicular y=2x+3,\at (1,3)
perpendicular\:y=2x+3,\at\:(1,3)
domain of f(x)=(1/5)
domain\:f(x)=(\frac{1}{5})
intercepts of f(x)=(x^2+2x-3)/(x^2-1)
intercepts\:f(x)=\frac{x^{2}+2x-3}{x^{2}-1}
inflection points of f(x)=4x^3-6x^2+7x-7
inflection\:points\:f(x)=4x^{3}-6x^{2}+7x-7
line (0.003514,6.61),((0.003203,6.26))
line\:(0.003514,6.61),((0.003203,6.26))
critical points of f(x)=x^2e^{(18x)}
critical\:points\:f(x)=x^{2}e^{(18x)}
slope of 5x-2y=4
slope\:5x-2y=4
range of f(x)=2xy-4x+6y-3=0
range\:f(x)=2xy-4x+6y-3=0
inverse of g(x)= x/2
inverse\:g(x)=\frac{x}{2}
y=-x^2+4x
y=-x^{2}+4x
range of-sqrt(64-x^2)
range\:-\sqrt{64-x^{2}}
domain of f(x)=e^{cos(x)}
domain\:f(x)=e^{\cos(x)}
extreme points of f(x)=x^3-6x^2+9x+5
extreme\:points\:f(x)=x^{3}-6x^{2}+9x+5
line (68,63.8),(104,106.8)
line\:(68,63.8),(104,106.8)
range of f(x)=(1-sqrt(x))^2
range\:f(x)=(1-\sqrt{x})^{2}
extreme points of f(x)=(x^2)/2+1/x
extreme\:points\:f(x)=\frac{x^{2}}{2}+\frac{1}{x}
domain of f(x)= 1/2 x+1
domain\:f(x)=\frac{1}{2}x+1
domain of f(x)=-sqrt(x-1)-3
domain\:f(x)=-\sqrt{x-1}-3
midpoint (-6.3,5.2)(1.8,-1)
midpoint\:(-6.3,5.2)(1.8,-1)
amplitude of 4sin(2x-(pi)/3)
amplitude\:4\sin(2x-\frac{\pi}{3})
asymptotes of f(x)=(3x+5)/(x-2)
asymptotes\:f(x)=\frac{3x+5}{x-2}
domain of f(x)=ln((x^2-3)/(1-x^2))
domain\:f(x)=\ln(\frac{x^{2}-3}{1-x^{2}})
inverse of f(x)=x3+1
inverse\:f(x)=x3+1
extreme points of f(x)= 1/(1-x)
extreme\:points\:f(x)=\frac{1}{1-x}
domain of f=-sqrt(x-1)e^{1/x}
domain\:f=-\sqrt{x-1}e^{\frac{1}{x}}
slope intercept of x+3y=0
slope\:intercept\:x+3y=0
intercepts of f(x)=x^2-5x+6
intercepts\:f(x)=x^{2}-5x+6
inverse of f(x)=6-x
inverse\:f(x)=6-x
inverse of f(x)=(x+5)/(-4x)
inverse\:f(x)=\frac{x+5}{-4x}
domain of f(x)=sqrt(t+3)
domain\:f(x)=\sqrt{t+3}
line (2.3,3)(5.1,0)
line\:(2.3,3)(5.1,0)
domain of e^{-t}
domain\:e^{-t}
critical points of f(x)=4x^2
critical\:points\:f(x)=4x^{2}
inverse of f(n)= 1/9 n-4/9
inverse\:f(n)=\frac{1}{9}n-\frac{4}{9}
domain of 2^x
domain\:2^{x}
domain of f(x)=x=-1
domain\:f(x)=x=-1
line (-4,12)m=-4
line\:(-4,12)m=-4
slope intercept of 2x-y=-5
slope\:intercept\:2x-y=-5
inverse of-6
inverse\:-6
domain of (x^2-6x+8)/(x^2-16)
domain\:\frac{x^{2}-6x+8}{x^{2}-16}
domain of f(x)=-7/((2+x)^2)
domain\:f(x)=-\frac{7}{(2+x)^{2}}
perpendicular 2x-2y+4=0,\at (2,4)
perpendicular\:2x-2y+4=0,\at\:(2,4)
asymptotes of f(x)=(x-1)/(x+2)
asymptotes\:f(x)=\frac{x-1}{x+2}
symmetry-x^3+3x^2+10x
symmetry\:-x^{3}+3x^{2}+10x
domain of 1/(3x-6)
domain\:\frac{1}{3x-6}
intercepts of (3x^2-3)/(x^2-5x+4)
intercepts\:\frac{3x^{2}-3}{x^{2}-5x+4}
inflection points of x^{1/7}(x+8)
inflection\:points\:x^{\frac{1}{7}}(x+8)
extreme points of x+5/x
extreme\:points\:x+\frac{5}{x}
inverse of y=ln(x-2)
inverse\:y=\ln(x-2)
extreme points of f(x)=xsqrt(196-x^2)
extreme\:points\:f(x)=x\sqrt{196-x^{2}}
asymptotes of f(x)=(x^2+8x-4)/(-2x-4)
asymptotes\:f(x)=\frac{x^{2}+8x-4}{-2x-4}
inflection points of f(x)=(x-3)e^{-x}
inflection\:points\:f(x)=(x-3)e^{-x}
inverse of f(x)=8sqrt(x),x>= 0
inverse\:f(x)=8\sqrt{x},x\ge\:0
inverse of sqrt(x^2+7x)
inverse\:\sqrt{x^{2}+7x}
critical points of f(x)=-x^2+3x
critical\:points\:f(x)=-x^{2}+3x
range of sqrt(x-5)+3
range\:\sqrt{x-5}+3
midpoint (2,3)(12,-15)
midpoint\:(2,3)(12,-15)
domain of f(x)=-6x+1
domain\:f(x)=-6x+1
critical points of f(x)=2x^3-3x^2-36x
critical\:points\:f(x)=2x^{3}-3x^{2}-36x
symmetry y=2x^2+3
symmetry\:y=2x^{2}+3
parallel 5x+2y=6
parallel\:5x+2y=6
intercepts of f(x)=(0,-3)(-9,-9)
intercepts\:f(x)=(0,-3)(-9,-9)
domain of f(x)=(x+6)/(x^2-25)
domain\:f(x)=\frac{x+6}{x^{2}-25}
inverse of sqrt(2x-1)
inverse\:\sqrt{2x-1}
domain of sqrt((4x+3)/(2x+5))
domain\:\sqrt{\frac{4x+3}{2x+5}}
domain of f(x)=-sqrt(x+2)
domain\:f(x)=-\sqrt{x+2}
slope intercept of 4x+y+5=0
slope\:intercept\:4x+y+5=0
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