Answer:
There is sufficient evidence to support the claim that the proportion of people over 55 who dream in black and white is greater than the proportion of those under 25. (0.1104, 0.2470)
Explanation:
Let :
[tex]n_{1}[/tex] be the number of people over the age of 55.
[tex]n_{2}[/tex] be the number of people under the age of 25.
[tex]x_{1}[/tex] be the number of people who dream in black and white over the age of 55.
[tex]x_{2}[/tex] is the number of people who dream in black and white under age of 25.
α be the significance level, from which the confidence level is calculated
Given :
[tex]n_{1} = 306[/tex]
[tex]n_{2} = 298[/tex]
[tex]x_{1} = 68[/tex]
[tex]x_{2} = 13[/tex]
[tex]\alpha=0.01[/tex]
The sample proportion is the number of successes divided by the sample size:
[tex]\hat p_{1}=\frac{x_{1} }{n_{1} }=\frac{68}{306}\approx 0.2222[/tex]
[tex]\hat p_{2}=\frac{x_{2} }{n_{2}}=\frac{13}{298} \approx 0.0436[/tex]
For confidence level 1 - α = 0.99.
determine [tex]\frac{z_{\alpha} }{2}=z_{0.005}[/tex] using the normal probability table.
[tex]\frac{z_{\alpha} }{2}=z_{0.005}=2.575[/tex]
The margine error is then:
[tex]E=\sqrt[\frac{z_{\alpha} }{2}]{\frac{\hat p\hat q}{n_{1} }+\frac{\hat p\hat q}{n_{2}}}=\sqrt[2.575]{\frac{0.222(1-0.2222)}{306}+\frac{0.0436(1 - 0.044)}{298}}\approx. 0.0684[/tex]
The confidence interval is then :
[tex]0.1104 = (0.2222 - 0.0436)-0.0684 = (\hat p_{1}-\hat p_{2})-E < p_{1}- p_{2} < ( \hat p_{1}-\hat p_{2})+E = (0.222-0.0436) + 0.0684 = 0.2470[/tex]
Confidence interval does not contain 0 thus the null hypothesis is rejected and the claim supported. There is sufficient evidence to support the claim that the proportion of people over 55 who dream in black and white is greater than the proportion of those under 25.
Find the sine of ∠R. A) 12 13 B) 13 12 C) 5 12 Eliminate D) 5 13
Without specific details or a diagram for angle R, we cannot accurately find its sine. However, sine is calculated as the ratio of the length of the side opposite the angle to the hypotenuse in a right-angled triangle.
Explanation:The question involves determining the sine of angle R. Without a diagram or specific triangle measurements provided, it's impossible to accurately answer this question. However, the sine of an angle in a right-angled triangle is defined as the ratio of the length of the side opposite the angle to the length of the hypotenuse. Using placeholder values for illustration, if angle R is opposite a side with length 5 and the hypotenuse of the triangle has a length of 13, then sin(R) = ⅓, which is not explicitly listed among the options provided. Yet, understanding this ratio helps to clarify how sine values are calculated in right-angled triangles.
You charged my bank card without my permission, and need to find out how you got my information and why you did this, immediately. My name is Jackie, my phone is ((850) 461-6041
Answer:
Excuse me, is this supposed to be an actual question or is it a complaint?
Explanation: