Questions LLC
Login
or
Sign Up
Ask a New Question
Math
Calculus
Suppose you know f(u) has the derivative f'(u). find the derivative with respect to t of the composite function f(ln(kt)+t^2)
1 answer
df/dt = df/du * du/dt = f'(u) * (1/t + 2t)
You can
ask a new question
or
answer this question
.
Related Questions
Suppose that y = f(x) = x^2-4x+4
Then on any interval where the inverse function y = f^–1(x) exists, the derivative of y =
if f(t)=sqrt(4t+1) find f''(2)
I got the first derivative to be: 1/2(4t-1)^-1/2 * 4t^3 and i'm trying to figure out if i need the
For what intervals is
g(x) = 1/x2 + 1 concave down? (Enter your answer using interval notation.) For this question I understand
Find the derivative function for the following functions using the first principles definition of the derivative
Find the second derivative for the function 5x^3+60x^2-36x-41
and solve the equation F(X)=0 i got to the second derivative but
Any help would be much appreciated with the steps involved in each problem given. Thank you.
1) Find derivative if y =cot x + sin
Any help would be much appreciated with the steps involved in each problem given. Thank you.
1) Find derivative if y =cot x + sin
Any help would be much appreciated with the steps involved in each problem given. Thank you.
1) Find derivative if y =cot x + sin
f(x,y)=x^2 - y^2
a)partial derivative with respect to x. So this means that you hold y^2 constant so would that be 0. So the
Find the first and second derivative - simplify your answer.
y=x/4x+1 I solved the first derivative and got 1/(4x+1)^2 Not sure