Question

If the function

{ a|π - x| +1, x ≤ 5
f (x) =
{b |π - x| +3, x > 5
is continuous at x = 5, then the value of a – b is
(A) 2/(5 - π)
(B) 2/(π - 5)
(C) 2/(π + 5)
(D) -2/(π + 5)

Answer 1

If the function

{ a|π - x| +1, x ≤ 5

f (x) =

{b |π - x| +3, x > 5

is continuous at x = 5, then the value of a – b is

(A) 2/(5 - π)✅

(B) 2/(π - 5)

(C) 2/(π + 5)

(D) -2/(π + 5)

Answer 2

Answer:

If the function

{ a|π - x| +1, x ≤ 5

f (x) =

{b |π - x| +3, x > 5

is continuous at x = 5, then the value of a – b is

(A) 2/(5 - π)

(B) 2/(π - 5)

(C) 2/(π + 5)

(D) -2/(π + 5)