Respuesta :
Answer:
The range that has a 95.45% probability that that student's typing speed will be in two months is [49.5, 65.5].
Explanation:
The compete question is:
A new student is taking 2 hrs of typing instruction per week, will practice 5 hrs per week and must type 2.5 hours per week for work. If the standard error of the estimate is 4, within what range do we have a 95.45% probability that that student's typing speed will be in two months?
Solution:
The regression equation formed by the typing instructor to investigate what factors determine typing speed for students with two months of instruction is as follows:
[tex]Y' = 11 + 7x_{1} + 5x_{2} + 3x_{3}[/tex]
Here,
Y' = typing speed in words per minute
x₁ = hours of instruction per week
x₂ = hours of practice per week
x₃ = hours of typing per week necessary for school or work
Compute the value of Y' for the given values of x₁, x₂ and x₃ as follows:
[tex]Y' = 11 + 7x_{1} + 5x_{2} + 3x_{3}[/tex]
[tex]=11+(7\times 2)+(5\times 5)+(3\times 2.5)\\=11+14+25+7.5\\=57.5[/tex]
So, the typing speed of this student in words per minute is 57.5.
The range providing the (1 - α)% prediction interval for values of Y' is:
[tex]Y=[Y'\pm t_{\alpha/2, (n-2)}\times SE][/tex]
Since the data selected is for 2 months the sample size is too large.
The critical value of t is 2.
Compute the range as follows:
[tex]Y=[Y'\pm t_{\alpha/2, (n-2)}\times SE][/tex]
[tex]=[57.5\pm 2\times 4]\\\\=[57.5\pm 8]\\\\=[49.5, 65.5][/tex]
Thus, the range that has a 95.45% probability that that student's typing speed will be in two months is [49.5, 65.5].
