MooreLikeMike
New member
- Joined
- Nov 10, 2020
- Messages
- 13
The question I'm working on asks to "Find : ∫ (e^(3x-1)e^(2x+2)-3/(4x+1))dx. Find two functions g (x) and h (x) such that g' (x) = (e^(3x-1)e^(2x+2)-3/(4x-1) = h' (x)
I found the antiderivative of the first part of the question: 1/5*e^(5x+1)-3/4*ln(abs(4x+1))+C. I just don't know how I'm supposed to find two functions. I originally thought that I was just supposed to write the function that I found twice, but changing the constant "C" to different numbers. But that doesn't seem right to me. I know that the one function I found satisfies g (x) OR h (x), but not both.
I found the antiderivative of the first part of the question: 1/5*e^(5x+1)-3/4*ln(abs(4x+1))+C. I just don't know how I'm supposed to find two functions. I originally thought that I was just supposed to write the function that I found twice, but changing the constant "C" to different numbers. But that doesn't seem right to me. I know that the one function I found satisfies g (x) OR h (x), but not both.