Find the values of k so that the function f is continuous at the indicated point in Exercises 26 to 29.
It is given that 
Also, it is given that function f is continuous at x = k,
So, if f is defined at x = p and if the value of the f at x = k equals the limit of f at x = k.
We can see that f is defined at x = p and
f(π) = kπ + 1
⇒ 
⇒ kπ + 1 = cosπ = kπ + 1
⇒ kπ + 1 = -1 = kπ + 1
⇒ k = 
Therefore, the required value of k is
.
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