If f:R→R satisfies f(x+y)=f(x) + f(y) for all x and y and 0∈C(f), then f is...

Suppose f is continuous on (−∞,∞), and the derivative satisfies: f' (x) < 0 on (−∞,...

Suppose f is continuous on (−∞,∞), and the derivative satisfies: f' (x) < 0 on (−∞, −2) ∪ (3,∞) and f' (x) > 0 on (−2, 3). What can you say about the local extrema of f?

Suppose that f : R → R such that, the lim h→0 [f(x) − f(x −...

Suppose that f : R → R such that, the lim h→0 [f(x) − f(x − h)] = 0 for all x ∈ R, then is f continuous in this case?

An everywhere continuous function f satisfies f''(x)= x2 -4x -5. Find the intervals where f is...

An everywhere continuous function f satisfies f''(x)= x2 -4x -5. Find the intervals where f is concave up and concave down.

Let f : R → R be a function satisfying |f(x) − f(y)| ≤ 3|x −...

Let f : R → R be a function satisfying |f(x) − f(y)| ≤ 3|x − y|^{1/2} for all x, y ∈ R. Apply E − δ definition to show that f is uniformly continuous in R.

1. Let W be the set of all [x y z}^t in R^3 such that xyz...

1. Let W be the set of all [x y z}^t in R^3 such that xyz = 0. Is W a subspace of R^3? 2. Let C^0 (R) denote the space of all continuous real-valued functions f(x) of x in R. Let W be the set of all continuous functions f(x) such that f(1) = 0. Is W a subspace of C^0(R)?

If f:X→Y is a function and A⊆X, then define f(A) ={y∈Y:f(a) =y for some a∈A}. (a)...

If f:X→Y is a function and A⊆X, then define f(A) ={y∈Y:f(a) =y for some a∈A}. (a) If f:R→R is defined by f(x) =x^2, then find f({1,3,5}). (b) If g:R→R is defined by g(x) = 2x+ 1, then find g(N). (c) Suppose f:X→Y is a function. Prove that for all B, C⊆X,f(B∩C)⊆f(B)∩f(C). Then DISPROVE that for all B, C⊆X,f(B∩C) =f(B)∩f(C).

A Uniform[0, 10] is a continuous random variable Y which assumes any value between [0, 10]...

A Uniform[0, 10] is a continuous random variable Y which assumes any value between [0, 10] with equal chance, with density f(y) = 1/10 for all y ∈ [0, 10] and zero everywhere else. Check that it satisfies the properties that a density function should have. Find its distribution function F(y) for all y ∈ (−∞,∞) and show that it satisfies the properties that a distribution function should have.

Show that a function f satisfies a Lipschitz condition with constant M if and only if...

Show that a function f satisfies a Lipschitz condition with constant M if and only if it is absolutely continuous and |f ' (x)|<= M almost everywhere.

A function f”R n × R m → R is bilinear if for all x, y...

A function f”R n × R m → R is bilinear if for all x, y ∈ R n and all w, z ∈ R m, and all a ∈ R: • f(x + ay, z) = f(x, z) + af(y, z) • f(x, w + az) = f(x, w) + af(x, z) (a) Prove that if f is bilinear, then (0.1) lim (h,k)→(0,0) |f(h, k)| |(h, k)| = 0. (b) Prove that Df(a, b) · (h, k) = f(a,...

Consider the vector field F(x,y,z)=〈−3y,−3x,−4z〉. Find a potential function f(x,y,z) for F which satisfies f(0,0,0)=0.

Consider the vector field F(x,y,z)=〈−3y,−3x,−4z〉. Find a potential function f(x,y,z) for F which satisfies f(0,0,0)=0.