Answer
No. See explanations.
Work Step by Step
Given $p=0.65, n=80, \hat p=57/80=0.7125$
a. State the hypotheses and identify the claim.
$H_o: p=0.65$ (claim)
$H_a: p\ne0.65$ (two tail test)
b. Find the critical value(s).
$\alpha=0.05, \alpha/2=0.025$
c. Compute the test value.
$z=\frac{0.7125-0.65}{\sqrt {0.65\times0.35/80}}=1.17, P=1-0.88=0.12$
d. Make the decision.
As $P\gt \alpha/2$, we fail to reject the null hypothesis.
e. Summarize the results.
At $\alpha=0.05$, the claim should not be rejected.