Find the P-value for the indicated hypothesis test with the given standardized test statistic, $z$. Decide whether to reject $\mathrm{H}_{0}$ for the given level of significance $\alpha$.
Right-tailed test with test statistic $z=1.93$ and $\alpha=0.06$
$P$-value $=0.0268$ (Round to four decimal places as needed.)
State your conclusion.
Fail to reject $\mathrm{H}_{0}$
Reject $\mathrm{H}_{0}$

Step 1 ：Given a right-tailed test with test statistic $z=1.93$ and level of significance $\alpha=0.06$.

Step 2 ：The P-value for the test is calculated to be $0.0268$.

Step 3 ：The P-value is the probability that, if the null hypothesis were true, we would observe a statistic at least as extreme as the one observed.

Step 4 ：To decide whether to reject the null hypothesis, we compare the P-value to the level of significance, $\alpha$. If the P-value is less than $\alpha$, we reject the null hypothesis. If the P-value is greater than $\alpha$, we fail to reject the null hypothesis.

Step 5 ：In this case, the P-value is $0.0268$ and $\alpha$ is $0.06$.

Step 6 ：Since the P-value is less than $\alpha$, we reject the null hypothesis.

Step 7 ：Final Answer: \(\boxed{\text{Reject } H_0}\)