Algebra
Calculus
Trigonometry
Matrix
Question
Function
Find the first partial derivative with respect to k
Find the first partial derivative with respect to v
∂k∂p=v1
Simplify
p=vk
Find the first partial derivative by treating the variable v as a constant and differentiating with respect to k
∂k∂p=∂k∂(vk)
Use differentiation rule ∂x∂(g(x)f(x))=(g(x))2∂x∂(f(x))×g(x)−f(x)×∂x∂(g(x))
∂k∂p=v2∂k∂(k)v−k×∂k∂(v)
Use ∂x∂xn=nxn−1 to find derivative
∂k∂p=v21×v−k×∂k∂(v)
Use ∂x∂(c)=0 to find derivative
∂k∂p=v21×v−k×0
Any expression multiplied by 1 remains the same
∂k∂p=v2v−k×0
Any expression multiplied by 0 equals 0
∂k∂p=v2v−0
Removing 0 doesn't change the value,so remove it from the expression
∂k∂p=v2v
Solution
More Steps
Evaluate
v2v
Use the product rule aman=an−m to simplify the expression
v2−11
Reduce the fraction
v1
∂k∂p=v1
Show Solution
Solve the equation
Solve for k
Solve for v
k=pv
Evaluate
p=vk
Swap the sides of the equation
vk=p
Cross multiply
k=vp
Solution
k=pv
Show Solution