let g be integrable on (0,1) and define h on (0,1) by h(x)=\int_0^x g dx. show...

Let C [0,1] be the set of all continuous functions from [0,1] to R. For any...

Let C [0,1] be the set of all continuous functions from [0,1] to R. For any f,g ∈ C[0,1] define dsup(f,g) = maxxE[0,1] |f(x)−g(x)| and d1(f,g) = ∫10 |f(x)−g(x)| dx. a) Prove that for any n≥1, one can find n points in C[0,1] such that, in dsup metric, the distance between any two points is equal to 1. b) Can one find 100 points in C[0,1] such that, in d1 metric, the distance between any two points is equal to...

Assume f : [a, b] → R is integrable. (a) Show that if g satisfies g(x)...

Assume f : [a, b] → R is integrable. (a) Show that if g satisfies g(x) = f(x) for all but a finite number of points in [a, b], then g is integrable as well. (b) Find an example to show that g may fail to be integrable if it differs from f at a countable number of points.

Let f: [0,1] -> [0,1] be a continuous function. Show that there exists xsubzero [0,1] such...

Let f: [0,1] -> [0,1] be a continuous function. Show that there exists xsubzero [0,1] such that f(xsubzero)=xsubzero

1. Let f : R2 → R2, f(x,y) = ?g(x,y),h(x,y)? where g,h : R2 → R....

1. Let f : R2 → R2, f(x,y) = ?g(x,y),h(x,y)? where g,h : R2 → R. Show that f is continuous at p0 ⇐⇒ both g,h are continuous at p0

Let f:[0,1]——>R be define by f(x)= x if x belong to rational number and 0 if...

Let f:[0,1]——>R be define by f(x)= x if x belong to rational number and 0 if x belong to irrational number and let g(x)=x (a) prove that for all partitions P of [0,1],we have U(f,P)=U(g,P).what does mean about U(f) and U(g)? (b)prove that U(g) greater than or equal 0.25 (c) prove that L(f)=0 (d) what does this tell us about the integrability of f ?

Let f(x)=−6, g(x)=−4x+4 and h(x)=−9x2. Consider the inner product 〈p,q〉=∫40p(x)q(x)dx in the vector space C0[0,4] of...

Let f(x)=−6, g(x)=−4x+4 and h(x)=−9x2. Consider the inner product 〈p,q〉=∫40p(x)q(x)dx in the vector space C0[0,4] of continuous functions on the domain [0,4]. Use the Gram-Schmidt process to determine an orthonormal basis for the subspace of C0[0,4] spanned by the functions f(x), g(x), and h(x).

1. For n exists in R, we define the function f by f(x)=x^n, x exists in...

1. For n exists in R, we define the function f by f(x)=x^n, x exists in (0,1), and f(x):=0 otherwise. For what value of n is f integrable? 2. For m exists in R, we define the function g by g(x)=x^m, x exists in (1,infinite), and g(x):=0 otherwise. For what value of m is g integrable?

(a) Show that the function g: (0,1)→(0,∞)with g(x) =(1−x)/x is a bijection (b)Show that the natural...

(a) Show that the function g: (0,1)→(0,∞)with g(x) =(1−x)/x is a bijection (b)Show that the natural logarithm ln: (0,∞)→R is a bijection (c) Show that R has the same cardinality as the interval (0,1)

Let G be an Abelian group and let H be a subgroup of G Define K...

Let G be an Abelian group and let H be a subgroup of G Define K = { g∈ G | g3 ∈ H }. Prove that K is a subgroup of G .

Let⇀H=〈−y(2 +x), x, yz〉 (a) Show that ⇀∇·⇀H= 0. (b) Since⇀H is defined and its component...

Let⇀H=〈−y(2 +x), x, yz〉 (a) Show that ⇀∇·⇀H= 0. (b) Since⇀H is defined and its component functions have continuous partials on R3, one can prove that there exists a vector field ⇀F such that ⇀∇×⇀F=⇀H. Show that F = (1/3xz−1/4y^2z)ˆı+(1/2xyz+2/3yz)ˆ−(1/3x^2+2/3y^2+1/4xy^2)ˆk satisfies this property. (c) Let⇀G=〈xz, xyz,−y^2〉. Show that⇀∇×⇀G is also equal to⇀H. (d) Find a function f such that⇀G=⇀F+⇀∇f.