The function is:
f(t) = t2−c if t∈(−∞,2)
f(t) = ct+8 if t∈[2,∞)
Continuity means that there are not holes or jumps, so the limt of t^2 - c as t approachs to 2 by the left must be equal to the value of f(t) when t =2
Limt (as t -> 2 by the left) of t^2 - c = 2^2 - c = 4 - c
and f(2) = c(2) + 8 = 2c + 8
=> 2c + 8 = 4 - c => 3c = 4 - 8 = -4
c = -4/3
Answer: c = - 4/3
