using the epsilon deal is continous, show that the function f(x)=x if x belongs to the...

Prove that the function f(x,y) is differentiable at (0,0) by using epsilon-delta method. (1) f(x,y) =...

Prove that the function f(x,y) is differentiable at (0,0) by using epsilon-delta method. (1) f(x,y) = x+y+xy (2) f(x,y) = sin(xy)

By using delta- epsilon show that the two definitions of the limit are equivalent Def1: lim┬(x→x_0...

By using delta- epsilon show that the two definitions of the limit are equivalent Def1: lim┬(x→x_0 )⁡〖f(x)=f(x_0)〗. If for any ϵ>0,there exist a δ>0 such that 0<|x-x_0 |<δ implies |f(x)-L|<ϵ Def2: If for any sequence {x_n }→x_0 we have f(x_n)→L

Prove that if f(x) is continous on [a,b], then f(x) is integrable on [a,b].

Prove that if f(x) is continous on [a,b], then f(x) is integrable on [a,b].

Use an epsilon-delta argument to show f(x) = 2x^2 - 1 is continuous at every a...

Use an epsilon-delta argument to show f(x) = 2x^2 - 1 is continuous at every a ∈ ℝ.

Show there does not exist a sequence of continuous functions fn : [0,1] → R converging...

Show there does not exist a sequence of continuous functions fn : [0,1] → R converging pointwise to the function f : [0,1] → R given by f(x) = 0 for x rational, f(x) = 1 for x irrational.

if f belongs to R[a,b] and k belongs to R show that kf belongs to R[a,b]

if f belongs to R[a,b] and k belongs to R show that kf belongs to R[a,b]

f(x) = x^2 +2x if x >= 3 -x+18 if x< 3. What is the epsilon...

f(x) = x^2 +2x if x >= 3 -x+18 if x< 3. What is the epsilon delta proof to show f is continuous at x=3?

28.8 Let f(x)=x^2 for x rational and f(x) = 0 for x irrational. (a) Prove f...

28.8 Let f(x)=x^2 for x rational and f(x) = 0 for x irrational. (a) Prove f is continuous at x = 0. (b) Prove f is discontinuous at all x not= 0. (c) Prove f is differentiable at x = 0.Warning: You cannot simply claim f '(x)=2x.

let f(x) = 3x3 - 2 and let epsilon>0 be given Find a delta so that...

let f(x) = 3x3 - 2 and let epsilon>0 be given Find a delta so that |x -1 |<=delta implies |f(x) -1|<=epsilon

Find a such that f(x) will be continous everywhere f(x)= ( x+1)        1<x<3         x^2+bx+c     ...

Find a such that f(x) will be continous everywhere f(x)= ( x+1)        1<x<3         x^2+bx+c      x< or equal to 1 and x > or equal to 3