Let f : [0, π] → R be defined byf (x) =(0 if x = 0,x sin 1x − 1x cos 1x if x̸ = 0.Is f continuous?

Consider the function f : R2 → R defined byf (x, y) =cos x sin yy if y̸ = 0cos x if y = 0.Is f continuous everywhere? Justify your answer

Consider the function f : R2 → R defined byf (x, y) =cos x sin yy if y̸ = 0cos x if y = 0.Is f continuous everywhere? Justify your answer.(b) Let g : R2 → R be defined byg(x, y) =2xy x2 − y2x2 + y2 if (x, y)̸ = (0, 0)a if (x, y) = (0, 0).(i) (2 marks) For what value(s) of a, if any, is g continuous at (0, 0)?

Suppose that f is a continuous function and that S1−1f (x)dx = π. What is the valueofSπ0f (cos(x)) sin(x)dx?

For each n ∈ N, define fn : [0, 1] → R byfn(x) =sin(x2n) cos(x2n)xn if x > 0,0 if x = 0.Prove that fn ∈ R[0, 1] for all n ∈ N and thatlimn→∞Z 10fn = 0.Proof. For each n ∈ N, using the inequality | sin(x2n)| ≤ x2n for x ∈ [0, 1], one sees that fn iscontinuous on [0, 1]. Hence, fn ∈ R[0, 1] for all n ∈ N. Further, by the comparison principle, for alln ≥ N,Z 10fn ≤Z 10|fn| ≤Z 10xn = 1n + 1 .Thus, by the squeeze theorem, we obtainlimn→∞Z 10fn = 0

Consider the function f : R → R defined by f (x)=1 if x∈ Q, f (x)=0 if x∈ R/Q, where is f continuous? be sure to prove your assertion