Where do I even begin with this question? Could someone show me step by step how to do each of these?

Suppose that the equations shown below are true. Use these to find the following integrals in parts a. through f. f(x) (4-5返), g(x)=ax(x +7) aJf(x)dx= (Use C as the arbitrary constant.) b. g)x(Use C as the arbitrary constant.) C. J [-f(x)]dx= □ (Use C as the arbitrary constant.) d. J [-g(x)Idx = □ (Use C as the arbitrary constant.) (Use C as the arbitrary constant) (Use C as the arbitrary constant)

Show transcribed image text Suppose that the equations shown below are true. Use these to find the following integrals in parts a. through f. f(x) (4-5返), g(x)=ax(x +7) aJf(x)dx= (Use C as the arbitrary constant.) b. g)x(Use C as the arbitrary constant.) C. J [-f(x)]dx= □ (Use C as the arbitrary constant.) d. J [-g(x)Idx = □ (Use C as the arbitrary constant.) (Use C as the arbitrary constant) (Use C as the arbitrary constant)

Evaluate the following integral dx (16-0 What substitution will be the most helpful for evaluating this integral? ○ B. x = 4 sin θ OC.xs4tan@ Find dx do Rewrite the given integral 'using this substitution (16-x) Simplify your answer) Evaluate the Indefinite integral dx 16 (Use C as the arbitrary constant.)

This Question: 1 pt 11 of 44 (0 complete) ▼ This Quiz: 44 pts possible Verify Property 2 of the definition of a probability density function over the given interval. f(x)-2āx2. [-2.4] What is Property 2 of the definition of a probability density function? OA. The area under the graph of f over the interval [a,b] is b. O B. The area under the graph of f over the interval [a,b] is 1. O C. The area under the graph of f over the interval [a,b] is a. Identify the formula for calculating the area under the graph of the function y fix) over the interval [a,b]. Choose the corect answer below. OA. b OB. f(x) dx-F(X) F(a) _ F(b) OD. f(x) dx[F(x) Fb)-F(a) f(x) dx IFx F(a)-F(b)

Substitute a, b, and fx) into the left side of the formula from the previous step 24 Next, determine F(x). First, find the antiderivative of f. Ax/ dx=D (Use C as the arbitrary constant.) Let C-Ο in the expression obtained above and let the resulting expression be F(x) Evaluate the result over -24 using the far right side of the formula for the area. area = Simplify Is Property 2 of the definition of a probability density function over the given interval now verified? Choose the corect answer below

Math 151 - Sections 34, 35, 36 - Workshop 1:2 This workshop has to do with the indefinite integral Jf(x) da. We have looked at the formula f f(x) dx = g(x) + constant, where g'(x) = f(x). Basically, finding the indefinite integral J f(x) dz is the problem of finding g(x) such that g,(z) = f(z). Any time you find such a g(x), it is easy to check whether you made a mistake in finding g(x). Just differentiate g(r) and see whether you get f(x) as the answer. For many f(x), there is no simple formula for any g(x) that has the property g'() f() The functions f(x) = e-z , f(x) = 012, f(x) = V1+14 are examples of f(x) for which you will never find a simple g(x) with the property g' (x)- f(x). It is not that we have not found a formula yet. Rather, we can prove that there is no formula that involves a finite combination of exponential functions, trigonometric functions, nth root functions, and the other basic functions that we are familiar with. On the other hand, there are many integration methods that will produce a g() for many common choices of f (x). Two of these methods are called substitution (which you will see later in Chapter 5) and integration by parts (which is taught in Math 152). These two methods can be used to do all of the problems that you see below. Since you have not seen substitution and integration by parts, you will have to use a different method, as indicated roblem 1. Find constants A, B, C, D, E such that re drAee + Ce + Dre" + Ee +constant. Hint: Differentiate the right side of the equation and solve for A, B, C, D, E Problem 2. Using the same hint, find constants A, B, C, D, E such that Problem 3. Using a similar hint, find constants A, B, C such that x2 cos(32) dz = Az? sin(3x) + Bx cos(3r) + C sin(3x) + constant. Problem A. Using a similar hint, find constants A, B, C such that z? sin(32) dz = Az? cos(3x) + Bx sin(3z) + Ccos(3x) + constant. Problem 5. Using a similar hint, find constants A, B such that ®3e® dr = Ax2ez" + Bez? + constant. Problem 6. Using similar methods, find r cos(ar) dz sin(az) de da where a is a constant