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pendiente intercept m=-1,(0,10)
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pendiente\:intercept\:m=-1,(0,10)
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periodicidad f(x)=y=1/2cos(2x)
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periodicidad\:f(x)=y=1/2\cos(2x)
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asíntotas f(x)=(x^2-2x)/(4x-16)
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asíntotas\:f(x)=\frac{x^{2}-2x}{4x-16}
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pendiente intercept 3x-4y=8
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pendiente\:intercept\:3x-4y=8
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inversa f(x)=2x^5-6
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inversa\:f(x)=2x^{5}-6
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inversa 3x^3-5
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inversa\:3x^{3}-5
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distancia (-2,5)(-6,8)
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distancia\:(-2,5)(-6,8)
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domínio (x-13)^2
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domínio\:(x-13)^{2}
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f(x)=1
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f(x)=1
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domínio y=2e^{x/2}-14
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domínio\:y=2e^{\frac{x}{2}}-14
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inversa f(x)=y=3x-1
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inversa\:f(x)=y=3x-1
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domínio y=(sqrt(x))/(5x^2+4x-1)
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domínio\:y=\frac{\sqrt{x}}{5x^{2}+4x-1}
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intersección 1-2x-x^2
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intersección\:1-2x-x^{2}
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inversa y=ln(x-4)
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inversa\:y=\ln(x-4)
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punto medio (3,0)(9,0)
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punto\:medio\:(3,0)(9,0)
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vértice f(x)=y=-x^2+4x-1
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vértice\:f(x)=y=-x^{2}+4x-1
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asíntotas f(x)=(2x^2)/(x^2+x-20)
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asíntotas\:f(x)=\frac{2x^{2}}{x^{2}+x-20}
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asíntotas 4/(2x^2-11x+5)
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asíntotas\:\frac{4}{2x^{2}-11x+5}
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domínio f(x)=\sqrt[4]{1-x^2}
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domínio\:f(x)=\sqrt[4]{1-x^{2}}
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paridad (arcsin(x))/(sin^2(x))
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paridad\:\frac{\arcsin(x)}{\sin^{2}(x)}
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domínio y= 4/(7sqrt(x))
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domínio\:y=\frac{4}{7\sqrt{x}}
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paralela y=x
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paralela\:y=x
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rango 1/(x-1)-3
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rango\:\frac{1}{x-1}-3
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critical points f(x)=x^{7/2}-8x^2
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critical\:points\:f(x)=x^{\frac{7}{2}}-8x^{2}
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inversa f(x)=ln(4/x-1)
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inversa\:f(x)=\ln(\frac{4}{x}-1)
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inversa f(x)=(16)/(x^2)
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inversa\:f(x)=\frac{16}{x^{2}}
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paralela y= 3/5 x-6
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paralela\:y=\frac{3}{5}x-6
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inversa f(x)=1+sqrt(3+5x)
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inversa\:f(x)=1+\sqrt{3+5x}
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recta y=-5
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recta\:y=-5
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inversa f(x)=50000(0.8)^x
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inversa\:f(x)=50000(0.8)^{x}
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domínio log_{10}(x-10)
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domínio\:\log_{10}(x-10)
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domínio f(x)=sqrt(-x)-2
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domínio\:f(x)=\sqrt{-x}-2
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domínio (x-3)^2-9
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domínio\:(x-3)^{2}-9
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recta y=3x+7
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recta\:y=3x+7
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critical points f(x)=6x
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critical\:points\:f(x)=6x
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recta (-3,0)(0,-4)
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recta\:(-3,0)(0,-4)
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inversa f(x)=2-sqrt(x-3)
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inversa\:f(x)=2-\sqrt{x-3}
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critical points (x-1)^3(x-3)^3
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critical\:points\:(x-1)^{3}(x-3)^{3}
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pendiente y= 1/3 x-2
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pendiente\:y=\frac{1}{3}x-2
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monotone intervals (e^x)/x
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monotone\:intervals\:\frac{e^{x}}{x}
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inversa f(x)=(4ln(x^2))/(e^2)
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inversa\:f(x)=\frac{4\ln(x^{2})}{e^{2}}
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domínio y=sqrt(x)+4
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domínio\:y=\sqrt{x}+4
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inflection points f(x)=x^3+x
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inflection\:points\:f(x)=x^{3}+x
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extreme points f(x)=4x^4+8x^3-52x^2-56x+96
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extreme\:points\:f(x)=4x^{4}+8x^{3}-52x^{2}-56x+96
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simetría y=-x^2+6x-8
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simetría\:y=-x^{2}+6x-8
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distancia (26.7,-6.3)(32.7,-14.3)
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distancia\:(26.7,-6.3)(32.7,-14.3)
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asíntotas f(x)=((x+2)(x-5))/((x+2))
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asíntotas\:f(x)=\frac{(x+2)(x-5)}{(x+2)}
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monotone intervals 1/(X^2)
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monotone\:intervals\:\frac{1}{X^{2}}
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y=x^2-4x
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y=x^{2}-4x
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intersección h(t)=144t-16t^2
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intersección\:h(t)=144t-16t^{2}
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domínio 2sqrt(x+1)
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domínio\:2\sqrt{x+1}
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distancia (7,3)(3,0)
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distancia\:(7,3)(3,0)
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intersección y=-x+3
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intersección\:y=-x+3
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rango f(x)=5+(6+x)^{1/2}
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rango\:f(x)=5+(6+x)^{\frac{1}{2}}
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domínio f(x)=5^x
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domínio\:f(x)=5^{x}
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inflection points f(x)=-3x^4-18x^3
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inflection\:points\:f(x)=-3x^{4}-18x^{3}
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domínio f(x)=sqrt(-2x+3)
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domínio\:f(x)=\sqrt{-2x+3}
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intersección x^2+8x
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intersección\:x^{2}+8x
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paridad ((2x^{n+1})^2(x^{3-n}))/(x^{2n)*x^{2n+2}}
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paridad\:\frac{(2x^{n+1})^{2}(x^{3-n})}{x^{2n}\cdot\:x^{2n+2}}
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critical points f(x)=x^4+20x^3+88x^2+9
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critical\:points\:f(x)=x^{4}+20x^{3}+88x^{2}+9
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asíntotas-log_{2}(x)
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asíntotas\:-\log_{2}(x)
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domínio f(x)=(x-3)/((x+4)(x-8))
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domínio\:f(x)=\frac{x-3}{(x+4)(x-8)}
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inversa f(x)=((x+9))/(1-2x)
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inversa\:f(x)=\frac{(x+9)}{1-2x}
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domínio f(x)=(x+8)/7
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domínio\:f(x)=\frac{x+8}{7}
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inversa h(x)=-4/(x+2)-3
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inversa\:h(x)=-\frac{4}{x+2}-3
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paridad (sin(6theta))/(theta+tan(8theta))
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paridad\:\frac{\sin(6\theta)}{\theta+\tan(8\theta)}
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inversa f(x)=(2x^4+7)/(1+x^2)
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inversa\:f(x)=\frac{2x^{4}+7}{1+x^{2}}
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inversa f(x)= 5/(x-3)
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inversa\:f(x)=\frac{5}{x-3}
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periodicidad f(x)=(cos(4xpi))/(sec(pi))e-sin(pi)
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periodicidad\:f(x)=\frac{\cos(4x\pi)}{\sec(\pi)}e-\sin(\pi)
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domínio f(x)=13-x^2
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domínio\:f(x)=13-x^{2}
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paralela y-6=-3(x-8),\at (1,6)
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paralela\:y-6=-3(x-8),\at\:(1,6)
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inversa sqrt(x-5)+1
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inversa\:\sqrt{x-5}+1
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inversa y=(x+3)/(x-1)
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inversa\:y=\frac{x+3}{x-1}
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inversa f(x)= x/(x+7)
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inversa\:f(x)=\frac{x}{x+7}
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asíntotas f(x)=log_{2}(x)
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asíntotas\:f(x)=\log_{2}(x)
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punto medio (-7,5)(5,9)
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punto\:medio\:(-7,5)(5,9)
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inversa f(x)=-sqrt(x+2)
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inversa\:f(x)=-\sqrt{x+2}
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domínio f(x)=sqrt(x+5)-(sqrt(1-x))/x
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domínio\:f(x)=\sqrt{x+5}-\frac{\sqrt{1-x}}{x}
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paridad arctan(tan(theta))
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paridad\:\arctan(\tan(\theta))
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inversa f(x)= 3/(x-1)+2
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inversa\:f(x)=\frac{3}{x-1}+2
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inversa f(x)=3x^3+5
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inversa\:f(x)=3x^{3}+5
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extreme points f(x)=((e^x-e^{-x}))/7
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extreme\:points\:f(x)=\frac{(e^{x}-e^{-x})}{7}
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extreme points f(x)=x^3-2x^2-x+1
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extreme\:points\:f(x)=x^{3}-2x^{2}-x+1
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inversa f(x)=(1-x)/(x+2)
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inversa\:f(x)=\frac{1-x}{x+2}
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asíntotas f(x)= 1/(x-3)-2
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asíntotas\:f(x)=\frac{1}{x-3}-2
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inversa f(x)=(x-4)^2+3
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inversa\:f(x)=(x-4)^{2}+3
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inversa f(x)=5+e^{2x+4}
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inversa\:f(x)=5+e^{2x+4}
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asíntotas f(x)=(x^2-9)/(x(x-3))
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asíntotas\:f(x)=\frac{x^{2}-9}{x(x-3)}
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asíntotas (9x)/(x+8)
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asíntotas\:\frac{9x}{x+8}
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pendiente intercept 2y=3x+7
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pendiente\:intercept\:2y=3x+7
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asíntotas (2x^2+10x+12)/(x^2-9)
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asíntotas\:\frac{2x^{2}+10x+12}{x^{2}-9}
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inversa f(x)=-7/6 x+7
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inversa\:f(x)=-\frac{7}{6}x+7
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intersección-x^2+6x-9
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intersección\:-x^{2}+6x-9
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punto medio (5,-6)(5,6)
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punto\:medio\:(5,-6)(5,6)
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periodicidad f(x)=sin((6pi x)/7)
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periodicidad\:f(x)=\sin(\frac{6\pi\:x}{7})
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inversa (x+4)^5
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inversa\:(x+4)^{5}
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recta (-4,-5)(6,3)
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recta\:(-4,-5)(6,3)
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cos^3(x)
|
\cos^{3}(x)
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critical points f(x)=(-12x^3+180x^2+15)/(25+20x^3+4x^6)
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critical\:points\:f(x)=\frac{-12x^{3}+180x^{2}+15}{25+20x^{3}+4x^{6}}
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domínio f(x)=cos(1/x)+log_{10}(x+1)
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domínio\:f(x)=\cos(\frac{1}{x})+\log_{10}(x+1)
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