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(\partial)/(\partial x)(3x^2y^4-4)
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\frac{\partial\:}{\partial\:x}(3x^{2}y^{4}-4)
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límite cuando x tiende a infinity de (x^3)/(10)(7/x-sin(7/x))
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\lim_{x\to\:\infty\:}(\frac{x^{3}}{10}(\frac{7}{x}-\sin(\frac{7}{x})))
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derivada de (3x^4-x/x)
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\frac{d}{dx}(\frac{3x^{4}-x}{x})
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límite cuando x tiende a 0 de (sin(x)-cos(x)sin(x))/(x^2)
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\lim_{x\to\:0}(\frac{\sin(x)-\cos(x)\sin(x)}{x^{2}})
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integral de 1/(sin(x)+cos(x))
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\int\:\frac{1}{\sin(x)+\cos(x)}dx
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integral de-1 a 1 de 1/(2x+3)
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\int_{\:-1}^{1}\frac{1}{2x+3}dx
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derivada de 1/3 x^{(1/2}-x^{(3/2)})
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\frac{d}{dx}(\frac{1}{3}x^{(\frac{1}{2})}-x^{(\frac{3}{2})})
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límite cuando x tiende a 2 de (2x^3-5x^2+3x-2)/(x^3-4x^2+5x-2)
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\lim_{x\to\:2}(\frac{2x^{3}-5x^{2}+3x-2}{x^{3}-4x^{2}+5x-2})
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tangent of f(x)= 1/(sqrt(x)),\at x= 1/4
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tangent\:of\:f(x)=\frac{1}{\sqrt{x}},\at\:x=\frac{1}{4}
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límite cuando x tiende a 1 de ((x^2+x+1)/(2+x))^{1/(x-1)}
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\lim_{x\to\:1}((\frac{x^{2}+x+1}{2+x})^{\frac{1}{x-1}})
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integral de (ln(t))
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\int\:(\ln(t))dt
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tangent of 8/((x^2+4))
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tangent\:of\:\frac{8}{(x^{2}+4)}
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derivada de log_{2}((x-1^3))
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\frac{d}{dx}(\log_{2}((x-1)^{3}))
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límite cuando x tiende a infinity de cos(1/(sqrt(x)))
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\lim_{x\to\:\infty\:}(\cos(\frac{1}{\sqrt{x}}))
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límite cuando x tiende a 0+de (x^2+1)^{1/x}
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\lim_{x\to\:0+}((x^{2}+1)^{\frac{1}{x}})
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derivative of f(x)=x*e^{-x+1}
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derivative\:of\:f(x)=x\cdot\:e^{-x+1}
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tangent of 4+5x^2-2x^3
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tangent\:of\:4+5x^{2}-2x^{3}
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límite cuando n tiende a infinity de (1+1/n)^{n+3}
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\lim_{n\to\:\infty\:}((1+\frac{1}{n})^{n+3})
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derivada de (sin(x+cos(x))/(e^x))
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\frac{d}{dx}(\frac{\sin(x)+\cos(x)}{e^{x}})
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límite cuando x tiende a 5-de 8-x-x^2
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\lim_{x\to\:5-}(8-x-x^{2})
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y^{\prime}=(x-2)/(y-2)
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y^{\prime\:}=\frac{x-2}{y-2}
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límite cuando x tiende a 8 de (1+\sqrt[3]{x})(3-6x^2+x^3)
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\lim_{x\to\:8}((1+\sqrt[3]{x})(3-6x^{2}+x^{3}))
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1/x (dy)/(dx)=(ysin(x))/(y^2+1)
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\frac{1}{x}\frac{dy}{dx}=\frac{ysin(x)}{y^{2}+1}
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derivada parcial de 2x^2+3y^2+5z^2
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\frac{\partial}{\partial\:x}(2x^{2}+3y^{2}+5z^{2})
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inclinação y=(((x+2))/((x-2)^2)),\at x=3
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inclinação\:y=(\frac{(x+2)}{(x-2)^{2}}),\at\:x=3
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límite cuando x tiende a 0+de (sin(x^2))/x
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\lim_{x\to\:0+}(\frac{\sin(x^{2})}{x})
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derivada de (x^2-3/(e^x))
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\frac{d}{dx}(\frac{x^{2}-3}{e^{x}})
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derivative of f(x)=(x^2+5)^9
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derivative\:of\:f(x)=(x^{2}+5)^{9}
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integral de t^3e^{t^2}
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\int\:t^{3}e^{t^{2}}dt
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derivada de 2+x
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\frac{d}{dx}(2+x)
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límite cuando x tiende a+infinity+de ((x/(x+1)))^x
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\lim_{x\to\:+\infty\:+}(((\frac{x}{x+1}))^{x})
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derivada implícita (dy)/(dx),15x=15y+5y^3+3y^5
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implicit\:derivative\:\frac{dy}{dx},15x=15y+5y^{3}+3y^{5}
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y^{\prime}+y/x =5*x^3
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y^{\prime\:}+\frac{y}{x}=5\cdot\:x^{3}
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derivada de e^{-2x}*sin(x)
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\frac{d}{dx}(e^{-2x}\cdot\:\sin(x))
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tangent of ((x^2-1))/(x^2+x+1),\at (1,0)
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tangent\:of\:\frac{(x^{2}-1)}{x^{2}+x+1},\at\:(1,0)
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|
integral de sqrt(1+e^{2x)}
|
\int\:\sqrt{1+e^{2x}}dx
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|
límite cuando x tiende a infinity de sqrt(x+6)-sqrt(x)
|
\lim_{x\to\:\infty\:}(\sqrt{x+6}-\sqrt{x})
|
|
límite cuando x tiende a infinity de ((x^3+3x+7))/(3x^3-4x^2+5x+2)
|
\lim_{x\to\:\infty\:}(\frac{(x^{3}+3x+7)}{3x^{3}-4x^{2}+5x+2})
|
|
límite cuando x tiende a 0 de (x^2-2x-4)/(x^3-1)
|
\lim_{x\to\:0}(\frac{x^{2}-2x-4}{x^{3}-1})
|
|
derivada de ln((x^2+4x+5^3))
|
\frac{d}{dx}(\ln((x^{2}+4x+5)^{3}))
|
|
integral de e-e^x
|
\int\:e-e^{x}dx
|
|
laplace 1/2 sin(4t)
|
laplace\:\frac{1}{2}\sin(4t)
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|
xy^{\prime}+y=-3x
|
xy^{\prime\:}+y=-3x
|
|
integral de 1 a 2 de sqrt(3x)+(ln(3x))/(3x)
|
\int_{\:1}^{2}\sqrt{3x}+\frac{\ln(3x)}{3x}dx
|
|
integral de 1/((v+7)^3)
|
\int\:\frac{1}{(v+7)^{3}}dv
|
|
derivative of f(x)=x^{2pi}
|
derivative\:of\:f(x)=x^{2\pi}
|
|
integral de (x-2)/x
|
\int\:\frac{x-2}{x}
|
|
serie de n=1 a infinity}((16^{n/2 de))/(2^{2n)}
|
\sum_{n=1}^{\infty\:}\frac{(16^{\frac{n}{2}})}{2^{2n}}
|
|
inversa laplace s/((s-2)^2)
|
inversa\:laplace\:\frac{s}{(s-2)^{2}}
|
|
integral de (e^{-bx})/(1-e^{-bx)}
|
\int\:\frac{e^{-bx}}{1-e^{-bx}}dx
|
|
derivada implícita (dy)/(dx),4xy^3-x^2y=6
|
implicit\:derivative\:\frac{dy}{dx},4xy^{3}-x^{2}y=6
|
|
integral de (e^x)/((x+1))
|
\int\:\frac{e^{x}}{(x+1)}dx
|
|
derivative of f(x)=y
|
derivative\:of\:f(x)=y
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|
inversa laplace (-s)/(s^2+25s+30)+1/s
|
inversa\:laplace\:\frac{-s}{s^{2}+25s+30}+\frac{1}{s}
|
|
integral de e^{2x}(1-3x)
|
\int\:e^{2x}(1-3x)dx
|
|
límite cuando x tiende a 4 de e^x
|
\lim_{x\to\:4}(e^{x})
|
|
límite cuando x tiende a 5 de (\sqrt[3]{x}-\sqrt[3]{5})/(x-5)
|
\lim_{x\to\:5}(\frac{\sqrt[3]{x}-\sqrt[3]{5}}{x-5})
|
|
límite cuando n tiende a infinity de (cos(pi n))/n
|
\lim_{n\to\:\infty\:}(\frac{\cos(\pi\:n)}{n})
|
|
límite cuando (x,y) tiende a (e^8,4) de ln(sqrt(xy))
|
\lim_{(\:x,y)\to\:(e^{8},4)}(\ln(\sqrt{xy}))
|
|
d/(da)(sin(a)-cos(a))
|
\frac{d}{da}(\sin(a)-\cos(a))
|
|
derivative of-(sin(x))/(cos(x))
|
derivative\:of\:-\frac{\sin(x)}{\cos(x)}
|
|
y^{\prime}=(x^2-1)/(y^2+1)
|
y^{\prime\:}=\frac{x^{2}-1}{y^{2}+1}
|
|
x^{\prime}-10x=0
|
x^{\prime\:}-10x=0
|
|
y^{\prime \prime}-12y^{\prime}+36y=30x+2
|
y^{\prime\:\prime\:}-12y^{\prime\:}+36y=30x+2
|
|
integral de 12y
|
\int\:12ydy
|
|
derivative of f(x)= 1/(4x^2+5x)
|
derivative\:of\:f(x)=\frac{1}{4x^{2}+5x}
|
|
derivative of (925+20x-0.079x^2)/(484)
|
derivative\:of\:\frac{925+20x-0.079x^{2}}{484}
|
|
derivada implícita (dy)/(dx),x^2*y^2+3x-4y=5
|
implicit\:derivative\:\frac{dy}{dx},x^{2}\cdot\:y^{2}+3x-4y=5
|
|
derivada de (csc^2(x-cot^3(x))/(tan(x^2+2x)))
|
\frac{d}{dx}(\frac{\csc^{2}(x)-\cot^{3}(x)}{\tan(x^{2}+2x)})
|
|
(dy)/(dx)-2xy=e^{x^2}
|
\frac{dy}{dx}-2xy=e^{x^{2}}
|
|
integral de x*log_{e}(x)
|
\int\:x\cdot\:\log_{e}(x)dx
|
|
integral de 9 a 24 de (-x+12)
|
\int_{\:9}^{24}(-x+12)dx
|
|
taylor ln(s)
|
taylor\:\ln(s)
|
|
y^{\prime}=(3y^2+4x)/(2xy)
|
y^{\prime\:}=\frac{3y^{2}+4x}{2xy}
|
|
límite cuando x tiende a infinity de ((x^2+sqrt(x)))/(x^2)
|
\lim_{x\to\:\infty\:}(\frac{(x^{2}+\sqrt{x})}{x^{2}})
|
|
integral de (x^2)/(sqrt(-4x^2-12x-5))
|
\int\:\frac{x^{2}}{\sqrt{-4x^{2}-12x-5}}dx
|
|
límite cuando x tiende a 8 de ((\sqrt[3]{x}-2))/((x-8))
|
\lim_{x\to\:8}(\frac{(\sqrt[3]{x}-2)}{(x-8)})
|
|
límite cuando x tiende a 0 de (ln(cos(4x)))/(ln(cos(5x)))
|
\lim_{x\to\:0}(\frac{\ln(\cos(4x))}{\ln(\cos(5x))})
|
|
derivada de f(xe^{1/(f(x))})
|
\frac{d}{dx}(f(x)e^{\frac{1}{f(x)}})
|
|
f^{\prime}(x)=((5x^2-9x+8))/(7x+6)
|
f^{\prime\:}(x)=\frac{(5x^{2}-9x+8)}{7x+6}
|
|
x((dy)/(dx))+y=y^2
|
x(\frac{dy}{dx})+y=y^{2}
|
|
(\partial)/(\partial x)(e^{-y})
|
\frac{\partial\:}{\partial\:x}(e^{-y})
|
|
v^{\prime}-2v=-2t
|
v^{\prime\:}-2v=-2t
|
|
integral de (-x-1)/(x^2+x+1)
|
\int\:\frac{-x-1}{x^{2}+x+1}dx
|
|
integral de x^5cos(2x)
|
\int\:x^{5}\cos(2x)dx
|
|
límite cuando x tiende a 0 de (sqrt(x+9-3))/(sqrt(x+16-4))
|
\lim_{x\to\:0}(\frac{\sqrt{x+9-3}}{\sqrt{x+16-4}})
|
|
tangent of y=(1+4x)^{3/2},\at x=2
|
tangent\:of\:y=(1+4x)^{\frac{3}{2}},\at\:x=2
|
|
tangent of f(x)=5-8x^2,\at (-2,-27)
|
tangent\:of\:f(x)=5-8x^{2},\at\:(-2,-27)
|
|
(x+2y)dx+(2x-y)dy=0
|
(x+2y)dx+(2x-y)dy=0
|
|
y^{\prime \prime}-3y^{\prime}+2y=0
|
y^{\prime\:\prime\:}-3y^{\prime\:}+2y=0
|
|
sqrt(x)+sqrt(y)y^{\prime}=0
|
\sqrt{x}+\sqrt{y}y^{\prime\:}=0
|
|
integral de (3-18x)/(sqrt(64-9x^2))
|
\int\:\frac{3-18x}{\sqrt{64-9x^{2}}}dx
|
|
límite cuando x tiende a 6 de (x^2+36)/(x-6)
|
\lim_{x\to\:6}(\frac{x^{2}+36}{x-6})
|
|
(dy)/(dx)=((e^x))/(y^2)
|
\frac{dy}{dx}=\frac{(e^{x})}{y^{2}}
|
|
integral de 1/(p^2+1)
|
\int\:\frac{1}{p^{2}+1}dp
|
|
integral de e a infinity de (11)/(x(ln(x))^3)
|
\int_{\:e}^{\infty\:}\frac{11}{x(\ln(x))^{3}}dx
|
|
derivada de xe^y+y^2e^x-1/3 x+4
|
\frac{d}{dx}(xe^{y}+y^{2}e^{x}-\frac{1}{3}x+4)
|
|
integral de xe^{3x^2}
|
\int\:xe^{3x^{2}}dx
|
|
límite cuando x tiende a 0 de (x^2+14x+49)/(8x^3+47x^2-63x)
|
\lim_{x\to\:0}(\frac{x^{2}+14x+49}{8x^{3}+47x^{2}-63x})
|
|
derivada de e^{ix}
|
\frac{d}{dx}(e^{ix})
|
