Identify a specific function f that has the following characteristics. Then draw it's graph. f(0)=3 f'(x)=-2...

2. a) Given f(x)=x^2-2x, Draw the graph of the function and find an approximation for the...

2. a) Given f(x)=x^2-2x, Draw the graph of the function and find an approximation for the area bounden by the graph from x=2 to x=4 using 4 subintervals. b) Find the area bounded by the graph of f and the x-axis from x=2 to x=4.                                                  c) Find the area bounded by the graph of f and the x-axis from x=0 to x=4. (Note that the functional values are negative from x=0 to x=2)

the function f(x) = ex - 2e-2x - 3/2 is graphed at right. evidently, f(x) has...

the function f(x) = ex - 2e-2x - 3/2 is graphed at right. evidently, f(x) has a zero in the interval (0,1). (a) show that f(x) is increasing on (-infinity, infinity) (so that no other zero of f exists.) (b) use one iteration of Newton's method to estimate the zero, starting with initial estimate x1 = 0. (c) it appears from the graph that f(x) has an inflection point at or near the zero of f. find the exact coordinates...

Show that f: [1, infinity) --> [2, infinity), f(x) = x+1/x is bijective and find it's...

Show that f: [1, infinity) --> [2, infinity), f(x) = x+1/x is bijective and find it's inverse function.

Let f(x) = x*(2-x) if x>=0, or x*(x+2) if x<0 i) graph the function from x=-3...

Let f(x) = x*(2-x) if x>=0, or x*(x+2) if x<0 i) graph the function from x=-3 to x=+3. If you like WolframAlpha, use Piecewise[{{x*(2-x),x=>0},{x*(x+2),x<0}}] If you like Desmos, use f(x)= {x>=0:x*(2-x), x<0:x*(x+2)} (for some reason, when you paste that it, it forgets the first curly-brace { so you’ll need to add it in by hand) Or, you can use this, but it makes it less clear how to take the derivative: f(x) = -sign(x)*x*(x - 2*sign(x) ) ii) Find and...

Part A The variable X(random variable) has a density function of the following f(x) = {5e-5x...

Part A The variable X(random variable) has a density function of the following f(x) = {5e-5x if 0<= x < infinity and 0 otherwise} Calculate E(ex) Part B Let X be a continuous random variable with probability density function f (x) = {6/x2 if 2<x<3 and 0 otherwise } Find E (ln (X)). .

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.

f '(−3) = f '(−2) = f '(0) =  f '(1) = 0, f '(x) < 0...

f '(−3) = f '(−2) = f '(0) =  f '(1) = 0, f '(x) < 0 if x < −3 or −2 < x < 0 or  x > 1 f '(x) > 0 if −3 < x < −2 or 0 < x < 1 f ''(x) < 0 if −2.5 < x < −1 or x > 0.5 f ''(x) > 0 if x < −2.5 or −1 < x < 0.5 Sketch the graph of a function

find the following for the function f(x)=3x^2+4x-4 a. f(0) b. f(3) c. f(-3) d. f(-x) e....

find the following for the function f(x)=3x^2+4x-4 a. f(0) b. f(3) c. f(-3) d. f(-x) e. -f(x) f. f(x+2) g. f(4x) h. f(x+h)

Consider the cubic function f: x^3 -10x^2 - 123x + 432 a) Sketch the graph of...

Consider the cubic function f: x^3 -10x^2 - 123x + 432 a) Sketch the graph of f. b) Identify the domain and co-domain in which f is NOT Injective and NOT surjective. Briefly explain c) Identify the domain and co-domain in which f is Injective but NOT Surjective. Briefly explain d) Identify the domain and co-domain in which f is Surjective but NOT Injective. Briefly explain e). Identify the domain and co-domain in which f is Bijective. Explain briefly

1). Consider the following function and point. f(x) = x3 + x + 3;    (−2, −7) (a)...

1). Consider the following function and point. f(x) = x3 + x + 3;    (−2, −7) (a) Find an equation of the tangent line to the graph of the function at the given point. y = 2) Consider the following function and point. See Example 10. f(x) = (5x + 1)2;    (0, 1) (a) Find an equation of the tangent line to the graph of the function at the given point. y =