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Calculadora de derivadas parciales
Calcular derivadas parciales paso a paso
Esta calculadora en línea calculará la derivada parcial de la función, con los pasos mostrados. Puede especificar cualquier orden de integración.
Solution
Your input: find ∂2∂x∂y(x3+4xy2+5y3−10)
First, find ∂∂x(x3+4xy2+5y3−10)
The derivative of a sum/difference is the sum/difference of derivatives:
∂∂x(x3+4xy2+5y3−10)=(−∂∂x(10)+∂∂x(x3)+∂∂x(5y3)+∂∂x(4xy2))Apply the constant multiple rule ∂∂x(c⋅f)=c⋅∂∂x(f) with c=4y2 and f=x:
∂∂x(4xy2)−∂∂x(10)+∂∂x(x3)+∂∂x(5y3)=4y2∂∂x(x)−∂∂x(10)+∂∂x(x3)+∂∂x(5y3)Apply the power rule ∂∂x(xn)=n⋅x−1+n with n=1, in other words ∂∂x(x)=1:
4y2∂∂x(x)−∂∂x(10)+∂∂x(x3)+∂∂x(5y3)=4y21−∂∂x(10)+∂∂x(x3)+∂∂x(5y3)The derivative of a constant is 0:
4y2−∂∂x(10)+∂∂x(x3)+∂∂x(5y3)=4y2−(0)+∂∂x(x3)+∂∂x(5y3)Apply the power rule ∂∂x(xn)=n⋅x−1+n with n=3:
4y2+∂∂x(x3)+∂∂x(5y3)=4y2+(3x−1+3)+∂∂x(5y3)=3x2+4y2+∂∂x(5y3)The derivative of a constant is 0:
3x2+4y2+∂∂x(5y3)=3x2+4y2+(0)Thus, ∂∂x(x3+4xy2+5y3−10)=3x2+4y2
Next, ∂2∂x∂y(x3+4xy2+5y3−10)=∂∂y(∂∂x(x3+4xy2+5y3−10))=∂∂y(3x2+4y2)
The derivative of a sum/difference is the sum/difference of derivatives:
∂∂y(3x2+4y2)=(∂∂y(3x2)+∂∂y(4y2))Apply the constant multiple rule ∂∂y(c⋅f)=c⋅∂∂y(f) with c=4 and f=y2:
∂∂y(4y2)+∂∂y(3x2)=(4∂∂y(y2))+∂∂y(3x2)Apply the power rule ∂∂y(yn)=n⋅y−1+n with n=2:
4∂∂y(y2)+∂∂y(3x2)=4(2y−1+2)+∂∂y(3x2)=8y+∂∂y(3x2)The derivative of a constant is 0:
8y+∂∂y(3x2)=8y+(0)Thus, ∂∂y(3x2+4y2)=8y
Therefore, ∂2∂x∂y(x3+4xy2+5y3−10)=8y
Answer: ∂2∂x∂y(x3+4xy2+5y3−10)=8y