Ask a New Question

Evaluate exactly, using the Fundamental

1. Express the given integral as the limit of a Riemann sum but do not evaluate:integral[0 to 3]((x^3 - 6x)dx) 2.Use the
1. 1 answer
2. asked by Ernie
3. 4,144 views
Evaluate exactly, using the Fundamental Theorem:∫^(π/4)_01cos2(x)dx=
1. 1 answer
2. asked by Destiny Padgett
3. 91 views
Evaluate exactly, using the Fundamental Theorem of Calculus:∫^r_0(x^4/7+8x)dx=
1. 1 answer
2. asked by Destiny Padgett
3. 123 views
Evaluate exactly, using the Fundamental Theorem of Calculus:∫^s_06e^xdx=
1. 1 answer
2. asked by Destiny Padgett
3. 139 views
definite Integrals (using fundamental Theorem)Evaluate from -1 to 2(x^2 - 4x)dx
1. 2 answers
2. asked by Stacy
3. 582 views
Evaluate exactly, using the Fundamental Theorem of Calculus:∫^s_06e^xdx=
1. 1 answer
2. asked by Destiny Padgett
3. 112 views
For the function F(t)=et2, let f(t)=F′(t). Write the integral ∫^b_a f(t)dt and evaluate it with the Fundamental Theorem of
1. 1 answer
2. asked by Destiny Padgett
3. 126 views
Use the fundamental theorem of calculus to evaluate the following integral∫^π/2 **the bottom is zeroe. |cosx| dx
1. 0 answers
2. asked by Roxy
3. 529 views
For the function F(t)=3^t, let f(t)=F′(t). Write the integral ∫^{b}_a f(t)dt and evaluate it with the Fundamental Theorem of
1. 1 answer
2. asked by Adrian
3. 164 views
(1 point) This is similar to a problem from the Hughes-Hallett textbook. Use the Fundamental Theorem of Calculus to evaluate the
1. 1 answer
2. asked by anonymous
3. 637 views