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extreme f(x)=-8+4x^2
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extreme\:f(x)=-8+4x^{2}
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extreme f(x)=(6x^2-x^4)/9
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extreme\:f(x)=\frac{6x^{2}-x^{4}}{9}
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extreme f(x)=2-4(sin(x))^2
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extreme\:f(x)=2-4(\sin(x))^{2}
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extreme f(x,y)=3+xy-x-2y
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extreme\:f(x,y)=3+xy-x-2y
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extreme f(x)=14+2x-x^2
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extreme\:f(x)=14+2x-x^{2}
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distancia (5,-6)(-3/5 ,1)
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distancia\:(5,-6)(-\frac{3}{5},1)
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extreme f(x)=ln(x^2+3x+5)
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extreme\:f(x)=\ln(x^{2}+3x+5)
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extreme f(x)=(x^7)/(e^{4x)}
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extreme\:f(x)=\frac{x^{7}}{e^{4x}}
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extreme sqrt(25-x^2-y^2)
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extreme\:\sqrt{25-x^{2}-y^{2}}
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extreme y=(3x-6)/(x+2)
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extreme\:y=\frac{3x-6}{x+2}
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extreme y=5-x^2
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extreme\:y=5-x^{2}
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extreme (-100(2x-1)4x^3(x-2))/(x(x-1)(x-2))
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extreme\:\frac{-100(2x-1)4x^{3}(x-2)}{x(x-1)(x-2)}
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f(x,y)=x^2y-xy+x^2
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f(x,y)=x^{2}y-xy+x^{2}
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extreme f(x,y)=y^2-x^2+4xy
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extreme\:f(x,y)=y^{2}-x^{2}+4xy
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g(x,y)=(x^2+y)/(x^2+y^2+1)
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g(x,y)=\frac{x^{2}+y}{x^{2}+y^{2}+1}
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extreme f(x)=-2x^3+24x^2-42x+9
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extreme\:f(x)=-2x^{3}+24x^{2}-42x+9
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recta m=1,\at (-4,3)
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recta\:m=1,\at\:(-4,3)
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inversa f(x)=y=-3^{(x+1.5)}+2.94
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inversa\:f(x)=y=-3^{(x+1.5)}+2.94
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inversa y=log_{2}(2x)
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inversa\:y=\log_{2}(2x)
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extreme y=9x^3-7x^2+3x+10
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extreme\:y=9x^{3}-7x^{2}+3x+10
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extreme f(x)=32.562*x^3-4*10^6*x^2+2*10^{11}*x-3*10^{15}
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extreme\:f(x)=32.562\cdot\:x^{3}-4\cdot\:10^{6}\cdot\:x^{2}+2\cdot\:10^{11}\cdot\:x-3\cdot\:10^{15}
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extreme sqrt(x^2-1)+2
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extreme\:\sqrt{x^{2}-1}+2
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extreme f(x)=-7/3 x^3+14x^2+147x+2
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extreme\:f(x)=-\frac{7}{3}x^{3}+14x^{2}+147x+2
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extreme f(x)=(x^3)/2-2x^2+1
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extreme\:f(x)=\frac{x^{3}}{2}-2x^{2}+1
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extreme \sqrt[3]{t}(8-t)
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extreme\:\sqrt[3]{t}(8-t)
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extreme f(x)=-x^2+50ln(x)
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extreme\:f(x)=-x^{2}+50\ln(x)
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extreme f(x)=-69.7x^2+625.6x
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extreme\:f(x)=-69.7x^{2}+625.6x
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mínimo f(x)= 1/2 (x+4)^2+6
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mínimo\:f(x)=\frac{1}{2}(x+4)^{2}+6
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extreme f(x)=-0.3x^2+2.4x+98.6
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extreme\:f(x)=-0.3x^{2}+2.4x+98.6
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inversa 3x-2
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inversa\:3x-2
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extreme f(x)=-0.3x^2+2.4x+98.8
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extreme\:f(x)=-0.3x^{2}+2.4x+98.8
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extreme 2/(x+3)-1
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extreme\:\frac{2}{x+3}-1
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extreme f(x)=(0.2x-1.79)^3sqrt(1.26x+2.87)
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extreme\:f(x)=(0.2x-1.79)^{3}\sqrt{1.26x+2.87}
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extreme 5x^3-15x
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extreme\:5x^{3}-15x
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extreme f(x,y)=xy+e^{xy}
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extreme\:f(x,y)=xy+e^{xy}
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f(x,y)=x^3+3*x*y-y^2
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f(x,y)=x^{3}+3\cdot\:x\cdot\:y-y^{2}
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extreme f(x)=4ln(2xe^{-x})
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extreme\:f(x)=4\ln(2xe^{-x})
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extreme f(x)=2x^3-3x+6
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extreme\:f(x)=2x^{3}-3x+6
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extreme f(x)=(y-3)/(y^2-3y+9)
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extreme\:f(x)=\frac{y-3}{y^{2}-3y+9}
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extreme f(x)=(16-x)(100x+1300)
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extreme\:f(x)=(16-x)(100x+1300)
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pendiente intercept x-2y=-2
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pendiente\:intercept\:x-2y=-2
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extreme f(x)= 1/(3x^{2/3)}
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extreme\:f(x)=\frac{1}{3x^{\frac{2}{3}}}
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extreme (2x-3)/x
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extreme\:\frac{2x-3}{x}
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extreme f(x)=x^3-x^2-x+6,-1<= x<= 2
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extreme\:f(x)=x^{3}-x^{2}-x+6,-1\le\:x\le\:2
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extreme f(x)=12x^3+15x^2-24x+12,0<= x<= 1
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extreme\:f(x)=12x^{3}+15x^{2}-24x+12,0\le\:x\le\:1
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extreme f(x)=3x^5-17x^3+12x^2-3x+pi
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extreme\:f(x)=3x^{5}-17x^{3}+12x^{2}-3x+π
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extreme f(x)=x+3(1-x)^{1/3}
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extreme\:f(x)=x+3(1-x)^{\frac{1}{3}}
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extreme {1-4x:x<= 0,x+1:x>0}
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extreme\:\left\{1-4x:x\le\:0,x+1:x>0\right\}
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extreme f(x)=7x-x^2+18
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extreme\:f(x)=7x-x^{2}+18
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mínimo 10+sqrt(x^2+6x+10)
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mínimo\:10+\sqrt{x^{2}+6x+10}
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extreme f(x,y)=x^3-3x^2+3y^2-y^3
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extreme\:f(x,y)=x^{3}-3x^{2}+3y^{2}-y^{3}
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punto medio (1,2)(-9,4)
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punto\:medio\:(1,2)(-9,4)
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extreme f(x)=(ln(x))/(3x),1<= x<= 4
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extreme\:f(x)=\frac{\ln(x)}{3x},1\le\:x\le\:4
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extreme f(x)=(1-2x-x^2+4y^2-2y^2)
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extreme\:f(x)=(1-2x-x^{2}+4y^{2}-2y^{2})
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mínimo 3+6x^2-4x^3
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mínimo\:3+6x^{2}-4x^{3}
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extreme f(x,y)=x^2+y^2+8x-4y+7
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extreme\:f(x,y)=x^{2}+y^{2}+8x-4y+7
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extreme f(x)=(y-1)/(y^2-y+1)
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extreme\:f(x)=\frac{y-1}{y^{2}-y+1}
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F(x,y)=15x^2-22xy+24x+8y^2-16y
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F(x,y)=15x^{2}-22xy+24x+8y^{2}-16y
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extreme x^6
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extreme\:x^{6}
|
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extreme f(x,y)=sqrt(x^2+y^2+4)
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extreme\:f(x,y)=\sqrt{x^{2}+y^{2}+4}
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extreme f(x)=x^2-8x+40
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extreme\:f(x)=x^{2}-8x+40
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extreme f(x)=(x+1)^{3/2}((70x^3-60x^2+48x-32))/(315)
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extreme\:f(x)=(x+1)^{\frac{3}{2}}\frac{(70x^{3}-60x^{2}+48x-32)}{315}
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|
pendiente 7x-2y=-2
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pendiente\:7x-2y=-2
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extreme f(x)=x^2-8x+18
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extreme\:f(x)=x^{2}-8x+18
|
|
extreme f(x)= x/(x^2+4),-5<= x<= 5
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extreme\:f(x)=\frac{x}{x^{2}+4},-5\le\:x\le\:5
|
|
extreme f(x)=-x^2-x-1
|
extreme\:f(x)=-x^{2}-x-1
|
|
mínimo f(x)=5(x-3)^2+2
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mínimo\:f(x)=5(x-3)^{2}+2
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|
extreme (e^x)/(4+e^x)
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extreme\:\frac{e^{x}}{4+e^{x}}
|
|
extreme f(x)=-5x^2-80x-310
|
extreme\:f(x)=-5x^{2}-80x-310
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|
f(x,y)=7x^2+8xy+4y^2+9xy^2+8x^2y
|
f(x,y)=7x^{2}+8xy+4y^{2}+9xy^{2}+8x^{2}y
|
|
extreme f(x)=f(x)=2cos(x)+sin(2x),0<= x<= ((pi))/((2))
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extreme\:f(x)=f(x)=2\cos(x)+\sin(2x),0\le\:x\le\:\frac{(π)}{(2)}
|
|
y=f(x,y)=-2x^2-2xz-4z^2+40x+90z-150
|
y=f(x,y)=-2x^{2}-2xz-4z^{2}+40x+90z-150
|
|
extreme f(x)=(x^4)/3-2x^3-20x^2+225x-(x^4}{12}+\frac{5x^3)/3-(25x^2)/2
|
extreme\:f(x)=\frac{x^{4}}{3}-2x^{3}-20x^{2}+225x-\frac{x^{4}}{12}+\frac{5x^{3}}{3}-\frac{25x^{2}}{2}
|
|
punto medio (0,5)(-2,-2/3)
|
punto\:medio\:(0,5)(-2,-\frac{2}{3})
|
|
extreme f(x)=-x^3+6x^2-17
|
extreme\:f(x)=-x^{3}+6x^{2}-17
|
|
extreme f(x)=-x^3+6x^2-18
|
extreme\:f(x)=-x^{3}+6x^{2}-18
|
|
extreme f(x)=x^2-2ln(x)
|
extreme\:f(x)=x^{2}-2\ln(x)
|
|
mínimo f(x)=(2e^x)/(x^5)
|
mínimo\:f(x)=\frac{2e^{x}}{x^{5}}
|
|
extreme f(x,y)=(9x^2+7x+10)(9y^2+4y+9)
|
extreme\:f(x,y)=(9x^{2}+7x+10)(9y^{2}+4y+9)
|
|
extreme f(x)=4x^2-2x+1
|
extreme\:f(x)=4x^{2}-2x+1
|
|
extreme a+(ln(x))^2
|
extreme\:a+(\ln(x))^{2}
|
|
f(x,y)=(x-2)(2y-y^2)
|
f(x,y)=(x-2)(2y-y^{2})
|
|
extreme f(x,y)=x^3-4x^2-4y^2+8xy-3x
|
extreme\:f(x,y)=x^{3}-4x^{2}-4y^{2}+8xy-3x
|
|
extreme f(x)=x^3-3x^2-9x-4
|
extreme\:f(x)=x^{3}-3x^{2}-9x-4
|
|
domínio f(x)=e^{-3t+2}
|
domínio\:f(x)=e^{-3t+2}
|
|
extreme f(x)=x^3-3x^2-9x-3
|
extreme\:f(x)=x^{3}-3x^{2}-9x-3
|
|
extreme f(x)=x^3-8x^2-12x+1
|
extreme\:f(x)=x^{3}-8x^{2}-12x+1
|
|
extreme f(x)=3cos(x),0<= x<= 4pi
|
extreme\:f(x)=3\cos(x),0\le\:x\le\:4π
|
|
extreme 4x+6y-x^2-y^2
|
extreme\:4x+6y-x^{2}-y^{2}
|
|
extreme f(x)=4x^{1/3}-x^{4/3}
|
extreme\:f(x)=4x^{\frac{1}{3}}-x^{\frac{4}{3}}
|
|
extreme f(x)=x^2sqrt(3-x)
|
extreme\:f(x)=x^{2}\sqrt{3-x}
|
|
extreme f(x)=sqrt(1-x)
|
extreme\:f(x)=\sqrt{1-x}
|
|
extreme f(x)=-3x^2-5x+7
|
extreme\:f(x)=-3x^{2}-5x+7
|
|
extreme 2x^3-2x^2-2x+9
|
extreme\:2x^{3}-2x^{2}-2x+9
|
|
extreme f(x)=320x^2-2560x^3
|
extreme\:f(x)=320x^{2}-2560x^{3}
|
|
inversa x-3
|
inversa\:x-3
|
|
f(x,y)=x^2-4x+y^2-6y-2
|
f(x,y)=x^{2}-4x+y^{2}-6y-2
|
|
mínimo f(x)= 1/3 x^3-1/2 x^2-2x
|
mínimo\:f(x)=\frac{1}{3}x^{3}-\frac{1}{2}x^{2}-2x
|
|
extreme f(x)=4x^3-x^2+9
|
extreme\:f(x)=4x^{3}-x^{2}+9
|
|
extreme x^2-6x+12
|
extreme\:x^{2}-6x+12
|
