# Calculus

posted by Kevin

which of the following is equivalent to integral (a,b) k*f(x)+C)dx where k and C are constants

k integral (a,b)(f(x)+C)dx *****

intergral (a,b)kdx + intergral (a,b)f(x)dx+ intergral (a,b) Cdx

k integral (a,b)f(x)+ integral (a,b) Cdx

integral (a,b) kdx * integral (a,b) f(x) dx +integral (a,b) Cdx

1. Steve

nope, you need k * f(x) and C alone.

∫k*f(x)+C dx
= ∫k*f(x) dx + ∫C dx
= k∫f(x) dx + ∫C dx

## Similar Questions

1. ### Calculus

Would someone clarify this for me... Is antiderivatives just another name for intergral and why is intergral of a function is the area under the curve?
2. ### Calculus II/III

A. Find the integral of the following function. Integral of (x√(x+1)) dx. B. Set up and evaluate the integral of (2√x) for the area of the surface generated by revolving the curve about the x-axis from 4 to 9. For part …
3. ### calc

how do you start this problem: integral of xe^(-2x) There are two ways: 1) Integration by parts. 2) Differentiation w.r.t. a suitably chosen parameter. Lets do 1) first. This is the "standard method", but it is often more tedious than …
4. ### Math/Calculus

How would I solve the following integral with the substitution rule?
5. ### calc asap!

can you help me get started on this integral by parts?
6. ### Calculus

Find the volume of the solid whose base is the region in the xy-plane bounded by the given curves and whose cross-sections perpendicular to the x-axis are (a) squares, (b) semicircles, and (c) equilateral triangles. for y=x^2, x=0, …
7. ### calculus(integral)

intergral 2x^2/(x^2+4x+8)
8. ### calculus (please with steps and explanations)

consider the function f that is continuous on the interval [-5,5] and for which the definite integral 0(bottom of integral sign) to 5(top of integral sign) of f(x)dx=4. Use the properties of the definite integral to evaluate each integral: …
9. ### Quick calc question

If f(x) and g(x) are continuous on [a, b], which one of the following statements is false?
10. ### Calculus

If f(x) and g(x) are continuous on [a, b], which one of the following statements is true?

More Similar Questions