Answer:
The probability that he weighs between 170 and 220 pounds
P( 170 ≤ x≤ 200) = 0.3811
Step-by-step explanation:
Explanation:-
Given mean of the Population = 200 pounds
Given standard deviation of the Population = 50 pounds
Let 'X' be the random variable of the weights of college football players are normally distributed.
Let x₁ = 170
[tex]Z_{1} = \frac{x_{1} - mean}{S.D}[/tex]
[tex]Z_{1} = \frac{170 - 200}{50}= -0.6[/tex]
Let x₂ = 220
[tex]Z_{2} = \frac{x_{2} - mean}{S.D}[/tex]
[tex]Z_{2} = \frac{220 - 200}{50}= 0.4[/tex]
The probability that he weighs between 170 and 220 pounds.
P( 170 ≤ x≤ 200) = P(Z₁ ≤z≤Z₂)
= P(-0.6 ≤z≤0.4)
= P(z≤0.4)-P(z≤-0.6)
= 0.5 + A(0.4) -(0.5 - A(-0.6)
= A(0.4) + A(0.6) A(-z) = A(z)
= 0.1554 +0.2257 ( check Areas in normal table)
= 0.3811
Conclusion:-
The probability that he weighs between 170 and 220 pounds
P( 170 ≤ x≤ 200) = 0.3811
