Respuesta :
Answer:
(a) The probability of a woman receiving a salary in excess of $75,000 is 0.1271.
(b) The probability of a man receiving a salary in excess of $75,000 is 0.0870.
(c) The probability of a woman receiving a salary below $50,000 is 0.9925.
(d) A woman would have to make a higher salary of $81,810 than 99% of her male counterparts.
Step-by-step explanation:
Let the random variable X represent the salary for women and Y represent the salary for men.
It is provided that:
[tex]X\sim N(67000, 7000^{2})\\\\Y\sim N(65500, 7000^{2})[/tex]
(a)
Compute the probability of a woman receiving a salary in excess of $75,000 as follows:
[tex]P(X>75000)=P(\frac{X-\mu_{x}}{\sigma_{x}}>\frac{75000-67000}{7000})[/tex]
[tex]=P(Z>1.14)\\\\=1-P(Z<1.14)\\\\=1-0.87286\\\\=0.12714\\\\\approx 0.1271[/tex]
Thus, the probability of a woman receiving a salary in excess of $75,000 is 0.1271.
(b)
Compute the probability of a man receiving a salary in excess of $75,000 as follows:
[tex]P(Y>75000)=P(\frac{Y-\mu_{y}}{\sigma_{y}}>\frac{75000-65500}{7000})[/tex]
[tex]=P(Z>1.36)\\\\=1-P(Z<1.36)\\\\=1-0.91309\\\\=0.08691\\\\\approx 0.0870[/tex]
Thus, the probability of a man receiving a salary in excess of $75,000 is 0.0870.
(c)
Compute the probability of a woman receiving a salary below $50,000 as follows:
[tex]P(X<50000)=P(\frac{X-\mu_{x}}{\sigma_{x}}<\frac{50000-67000}{7000})[/tex]
[tex]=P(Z>-2.43)\\\\=P(Z<2.43)\\\\=0.99245\\\\\approx 0.9925[/tex]
Thus, the probability of a woman receiving a salary below $50,000 is 0.9925.
(d)
Let a represent the salary a woman have to make to have a higher salary than 99% of her male counterparts.
Then,
[tex]P(Y\leq a)=0.99[/tex]
[tex]\Rightarrow P(Z<z)=0.99[/tex]
The z-score for this probability is:
z-score = 2.33
Compute the value of a as follows:
[tex]\frac{a-\mu_{y}}{\sigma_{y}}=2.33\\\\[/tex]
[tex]a=\mu_{y}+(2.33\times \sigma_{y})\\\\[/tex]
[tex]=65500+(2.33\times7000)\\\\=65500+16310\\\\=81810[/tex]
Thus, a woman would have to make a higher salary of $81,810 than 99% of her male counterparts.
