Find the value of c such that the function is continuous on the entire real number...

Find the constant a such that the function is continuous on the entire real line. f(x)...

Find the constant a such that the function is continuous on the entire real line. f(x) = 8x2,      x ≥ 1 ax − 3,      x < 1

A function f is said to be continuous on the _______ at x = c if...

A function f is said to be continuous on the _______ at x = c if lim x → c + f ( x ) = f ( c ). A function f is said to be continuous on the _______ at x = c if lim x → c − f ( x ) = f ( c ). A real number x is a _______ number for a function f if f is discontinuous at x or f...

Suppose you choose a real number X from the interval [3,16] with the density function f(x)=Cx,...

Suppose you choose a real number X from the interval [3,16] with the density function f(x)=Cx, where C is a constant. a) Find C. Remember that if you integrate a density function over the entire sample space interval, you should get 1. b) Find P(E), where E=[a,b] is a subinterval of [3,16] (as a function of a and b ). c) Find P(X>4) d) Find P(X<14) e) Find P(X^2−18X+56≥0) Note: You can earn partial credit on this problem.

Let f be a continuous function on the real line. Suppose f is uniformly continuous on...

Let f be a continuous function on the real line. Suppose f is uniformly continuous on the set of all rationals. Prove that f is uniformly continuous on the real line.

A continuous random variable X has the following probability density function F(x) = cx^3, 0<x<2 and...

A continuous random variable X has the following probability density function F(x) = cx^3, 0<x<2 and 0 otherwise (a) Find the value c such that f(x) is indeed a density function. (b) Write out the cumulative distribution function of X. (c) P(1 < X < 3) =? (d) Write out the mean and variance of X. (e) Let Y be another continuous random variable such that  when 0 < X < 2, and 0 otherwise. Calculate the mean of Y.

1. Does the function satisfy the hypotheses of the Mean Value Theorem on the given interval?...

1. Does the function satisfy the hypotheses of the Mean Value Theorem on the given interval? f(x) = x3 + x − 5,    [0, 2] a) No, f is continuous on [0, 2] but not differentiable on (0, 2). b) Yes, it does not matter if f is continuous or differentiable; every function satisfies the Mean Value Theorem.     c) There is not enough information to verify if this function satisfies the Mean Value Theorem. d) Yes, f is continuous on [0,...

1. Let f be the function defined by f(x) = x 2 on the positive real...

1. Let f be the function defined by f(x) = x 2 on the positive real numbers. Find the equation of the line tangent to the graph of f at the point (3, 9). 2. Graph the reflection of the graph of f and the line tangent to the graph of f at the point (3, 9) about the line y = x. I really need help on number 2!!!! It's urgent!

6. A continuous random variable X has probability density function f(x) = 0 if x< 0...

6. A continuous random variable X has probability density function f(x) = 0 if x< 0 x/4 if 0 < or = x< 2 1/2 if 2 < or = x< 3 0 if x> or = 3 (a) Find P(X<1) (b) Find P(X<2.5) (c) Find the cumulative distribution function F(x) = P(X< or = x). Be sure to define the function for all real numbers x. (Hint: The cdf will involve four pieces, depending on an interval/range for x....

Let X be a continuous random variable with the probability density function f(x) = C x,...

Let X be a continuous random variable with the probability density function f(x) = C x, 6 ≤ x ≤ 25, zero otherwise. a. Find the value of C that would make f(x) a valid probability density function. Enter a fraction (e.g. 2/5): C = b. Find the probability P(X > 16). Give your answer to 4 decimal places. c. Find the mean of the probability distribution of X. Give your answer to 4 decimal places. d. Find the median...

Find the value of C > 0 such that the function ?C sin2x, if0≤x≤π, f(x) =...

Find the value of C > 0 such that the function ?C sin2x, if0≤x≤π, f(x) = 0, otherwise is a probability density function. Hint: Remember that sin2 x = 12 (1 − cos 2x). 2. Suppose that a continuous random variable X has probability density function given by the above f(x), where C > 0 is the value you computed in the previous exercise. Compute E(X). Hint: Use integration by parts! 3. Compute E(cos(X)). Hint: Use integration by substitution!