Count the number of different functions with the given domain, target and additional properties. (a) f:...

a fixed point of a function f is a number c in its domain such that...

a fixed point of a function f is a number c in its domain such that f(c)=c. use the intermediate value theorem to prove that any continious function with domain [0,1] and range a subset of [0,1] must have a fixed point.[hint: consider the function f(x)-x] “Recall the intermediate value theorem:suppose that f is countinous function with domain[a,b]and let N be any number between f(a)and f(b), where f(a)not equal to f(b). Then there exist at least one number c in...

Give the formula for a function with domain (5, ∞) that has the following properties: •...

Give the formula for a function with domain (5, ∞) that has the following properties: • f is a positive function that is continuous on (5, ∞) • f has an infinite discontinuity at x = 5 • the area under y = f(x) and over the x-axis (for x > 5) is equal to 7. You must verify that the area is 7 by writing down and correctly evaluating an appropriate improper integral.

Remember that the DOMAIN is INTEGERS (....,-2,-1,0,1,2,3,4.......) and the TARGET is POSITIVE INTEGERS (1,2,3,4,.....) . Give...

Remember that the DOMAIN is INTEGERS (....,-2,-1,0,1,2,3,4.......) and the TARGET is POSITIVE INTEGERS (1,2,3,4,.....) . Give explanation and proofing for each . Find a function whose domain is the set of all integers and whose target is the set of all positive integers that satisfies each set of properties. (a) Neither one-to-one, nor onto. (b) One-to-one, but not onto. (c) Onto, but not one-to-one. (d) One-to-one and onto.

4) For each of the following functions, establish on which subset of its domain it is...

4) For each of the following functions, establish on which subset of its domain it is C1. (You do not need to provide formal proofs in your answers: an explanation or brief graphical argument is sufficient.) Compute partial derivatives for these subsets. (a) f(x) = ⌈x⌉ (recall ⌈x⌉ is the lowest integer above or equal to x). (b) f(x, y) = min{x, y}. (c) f(x, y) = xαyβ where α, β ∈ (0,1).

Find each of the following functions. f(x) = 4 − 4x, g(x) = cos(x) (a) f...

Find each of the following functions. f(x) = 4 − 4x, g(x) = cos(x) (a) f ∘ g and State the domain of the function. (Enter your answer using interval notation.) (b) g ∘ f and State the domain of the function. (Enter your answer using interval notation.) (c) f ∘ f and State the domain of the function. (Enter your answer using interval notation.) (d) g ∘ g and State the domain of the function. (Enter your answer using...

The domain of the function g(x) is -1<x<6 and the range is -5<y<10. Find the domain...

The domain of the function g(x) is -1<x<6 and the range is -5<y<10. Find the domain and range of the following given functions. a). the domain of y=g(x-4) is? b.) the range of y=g(x)+2 is?

Proof: Let f and g be functions defined on (possibly different) closed intervals, and assume the...

Proof: Let f and g be functions defined on (possibly different) closed intervals, and assume the range of f is contained in the domain of g so that the composition g ◦ f is properly defined If f is integrable and g is increasing, then g ◦ f is integrable.

solve the following for the domain of the functions in interval notation. Show all work a)...

solve the following for the domain of the functions in interval notation. Show all work a) f(x)=x2-64/x2-6x-16 b)f(x)=√15-3x (square root is over all of 15-3x) c) f(x)=√x+7 -3/x-2 (square root is over x+7

1 Approximation of functions by polynomials Let the function f(x) be given by the following: f(x)...

1 Approximation of functions by polynomials Let the function f(x) be given by the following: f(x) = 1/ 1 + x^2 Use polyfit to approximate f(x) by polynomials of degree k = 2, 4, and 6. Plot the approximating polynomials and f(x) on the same plot over an appropriate domain. Also, plot the approximation error for each case. Note that you also will need polyval to evaluate the approximating polynomial. Submit your code and both plots. Make sure each of...

Given ?(?,?) = sqrt(x + y) a). What’s the domain and range of f(x, y)? b)....

Given ?(?,?) = sqrt(x + y) a). What’s the domain and range of f(x, y)? b). Sketch any 3 level curves in the domain of the function (on the same graph). Label any points where the level curves cross an axis AND label the value of f(x, y) on each curve. c. Please do the same for g(x,y)= -y/x^2