Answer:
95% confidence interval: (-0.0586,0.0106)
Step-by-step explanation:
We are given the following in the question:
In 2015, 420 out of 1090 people surveyed said it was serious.
[tex]x_1 = 420\\n_1 = 1090\\\\p_1 = \displaystyle\frac{x_1}{n_1} = \frac{420}{1090} = 0.385[/tex]
In 2016, 1063 out of 2,600 people surveyed said it is serious.
[tex]x_2 = 1063\\n_2 = 2600\\\\p_2 = \displaystyle\frac{x_2}{n_2} = \frac{1063}{2600} = 0.409[/tex]
a) Confidence Interval:
[tex](p_1-p_2) \pm z_{critical}\sqrt{\displaystyle\frac{p_1(1-p_1}{n_1}+\frac{p_2(1-p_2)}{n_2}}[/tex]
[tex]z_{critical}\text{ at}~\alpha_{0.05} = 1.96[/tex]
Putting the values, we get:
[tex](0.385 - 0.409) \pm 1.96\sqrt{\displaystyle\frac{0.385(1-0.385)}{1090}+\frac{0.409(1-0.409)}{2600}}\\\\=-0.024 \pm 0.0346\\=(-0.0586,0.0106)[/tex]
b) Since confidence interval contains 0 , hence there is no significant difference at a = 0.05
