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A website for bed and breakfast inns gets approximately seven visitors per minute.
Suppose the number of website visitors per minute.
a. Compute the probability of no website visitors in a one-minute period. b. Compute the probability of two or more website visitors in a one-minute period. c. Compute the probability of one or more website visitors in a 30-second period. d. Compute the probability of five or more website visitors in a one-minute period.
Find the volume of the solid generated when the region enclosed by
y = √(x + 3), y = √(2x + 1), x = 0 is revolved about the x-axis.
f (x) = xe−x Determine the y–intercept
Find the largest possible area of a shaded rectangle which lies within parabola "g(x) = - x^2 + 12" which has its base on the x-axis and two of its vertices lying on the parabola and above the x-axis.
1/x( √4+x^2)^3 using substitution x = 2 tan ϴ
Let f be a differentiable function on [alpha and beta ] and x =[alpha and beta]. Show that, if f '(x) =0 and f''(x) > 0, then f must have a local maximum at x.
True or False.
Function "g(x) = x^3 + 5x - 3" has no tangent
True or False.
If "f(x) = 1\/\u221ax" , then "f'(0)" does not exist.
Find two positive integers whose product is 100 and whose sum is minimum
Eliminate the parameter t.
x = 4 csc t - 4, y = 4cot t - 3
