**SOLUTION Find C and a so that f(x) = Ca^x satisfies the**

Well there would be more but I only remember these many right now, they all use values of f(x) at different values of x to either give f(x) or value of f(x) at some x. If it were upto me, I would use Lagrange’s interpolation formula ( easier and give more accurate solution if more values of f(x) is given ).... Find f(x) so that it satisfies: f'(x)=1+e^x+1/x and f(1)=3+e. Another tutor was kind enough to give me the anti deriv as x+e^x+ln x+c and that the constant is 2.

**Laplace's equation Wikipedia**

Similar Questions. Calculus. Find f(x) so that it satisfies: f'(x)=1/sqrt(x) and f(4)=2. Please show steps I keep getting stuck at the anti derivative and the constant doesn't solve it so I …... Exploring the Mean Value Theorem . Calculus I Project. Objective. 1. To understand when to apply the Mean Value Theorem. 2. To develop a graphical interpretation of the Mean Value Theorem

**Solved Find F(x) If Y = F(x) Satisfies Dy/dx = 78yx^12 An**

But then f(x) = C e x so f is a constant times the exponential function. The fact that the functions with zero derivatives are the constant functions is a consequence of the mean value theorem: If g is a function that is not constant, and say g(a) = b and g(c) = d (with b different from d), then you can find some x between a and c such that how to find a book by character name 27/10/2010 · Determine if the given function satisfies the Mean Value Theorem on (0,5). If so, find all numbers c on the interval that satisfy the theorem f(x) = 3sqrt(25-x^2) I do not understand how to do this question, help and steps would be much appreciated

**If the function f satisfies f(x) = f (10-x) how would one**

But then f(x) = C e x so f is a constant times the exponential function. The fact that the functions with zero derivatives are the constant functions is a consequence of the mean value theorem: If g is a function that is not constant, and say g(a) = b and g(c) = d (with b different from d), then you can find some x between a and c such that how to find 1 part of a ratio Example Question #1 : How To Find F(X) If a(x) = 2x 3 + x, and b(x) = –2x, what is a(b(2))? Possible Answers: 128. 503. 132 –132 –503. Correct answer: –132. Explanation: When functions are set up within other functions like in this problem, the function closest to the given variable is performed first. The value obtained from this function is then plugged in as the variable in the

## How long can it take?

### Solved Find The Function F That Satisfies The Initial Con

- Find the antiderivative F(x) of f(x) = 5x^4 4x^5 that
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## How To Find F X That Satisfied

What about at x = 0? The "logical" response would be to see that g(0) = 0 and say that g'(0) must therefore equal 0. Careful, though...looking back at the limit definition of the derivative, the derivative of f at a point c is the limit of the slope of f as the change in its independent variable approaches 0.

- Exploring the Mean Value Theorem . Calculus I Project. Objective. 1. To understand when to apply the Mean Value Theorem. 2. To develop a graphical interpretation of the Mean Value Theorem
- 28/05/2018 · Find the vertex of the function if it's quadratic. If you're working with a straight line or any function with a polynomial of an odd number, such as f(x) = 6x 3 +2x + 7, you can skip this step.
- Similar Questions. calculus help. Does the function satisfy the hypotheses of the Mean Value Theorem on the given interval? f(x)= ln(x) , [1,6] If it satisfies the hypotheses, find all numbers c that satisfy the conclusion of the Mean Value Theorem.
- 11/06/2010 · Best Answer: If all you want is an interval where the outputs have the same height (where the f(x) values are the same), which seems to be the case since polynomial functions such as this one are everywhere continuous and differentiable, just solve the equation for when x^4 + x³ - x² + x - 2 = 0.