How do you find the derivative of #G(x)=int (e^(t^2))dt# from #[1,x]#?
2 Answers
You should get
You can use Leibniz's integral rule.
#(dG(x))/(dx) -= d/(dx) [int_(g(x))^(h(x)) f(x,t)dt]#
#= int_(g(x))^(h(x)) (delf)/(delx)dt + f(x,h(x))(dh)/(dx) - f(x,g(x))(dg)/(dx)#
In this case,
#(dg)/(dx) = 0# #(dh)/(dx) = 1# #f(x,h(x)) = f(x,t = x) = e^(x^2)# #f(x,g(x)) = f(x,t = 1) = e^(1^2) = e# #(delf)/(delx) = (del)/(delx)[e^(t^2)]_x = 0#
Therefore:
#color(blue)((dG)/(dx)) = cancel(int_(1)^(x) 0dt)^(0) + e^(x^2)cdot1 - cancel(ecdot0)#
#= color(blue)(e^(x^2))#
# d/dx \ int_1^x e^(t^2) \ dt = e^(x^2) #
Explanation:
If asked to find the derivative of an integral then you should not evaluate the integral but instead use the fundamental theorem of Calculus.
The FTOC tells us that:
# d/dx \ int_a^x \ f(t) \ dt = f(x) # for any constant#a#
(ie the derivative of an integral gives us the original function back).
We are asked to find:
# d/dx \ int_1^x e^(t^2) \ dt #
And this integral is in the correct form for the FTOC to be applied, giving:
# d/dx \ int_1^x e^(t^2) \ dt = e^(x^2) #
