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Question: A continuous money flow begins at $12,000 and increases exponentially at 6% per year for 12 years. Find the (a) present value and (b ) final value, if money is worth r = 5%compounded continuously.
Show that the greedy algorithm for making change for n cents using quarters, dimes, nickels and pennies has O(n) complexity measured in terms of comparisons needed.
Assume that death benefits are nonincreasing. Show that the reserve at time n is higher for the starred rates (the steeper curve).
find the center of the mass of a thin plate of constant density covering the region bounded by the x-axis and the curve y=3cosx, x is greater than or equal to -pie/8 and less than or equal to pie/8
There is a very famous distribution that describes the frequency of the number of times a number comes up in a series of dice rolls, what is its name?
a company car has a seating capacity of 8 is to be used by 8 employees who have formed a car pool. if only 3 of theses employees can drive, how many possible seating arrangements are there for the group?
The radius of a sphere is increasing at a rate of 6 mm/s. How fast is the volume increasing when the diameter is 60 mm? Evaluate your answer numerically.
SPREAD OF HIV The estimated number of children newly infected with HIV through mother-to-child contact worldwide is given.
Write an equation and solve: Each month an employee has $75 invested in a stock investment plan. This amounts to 5 percent of the employee's monthly salary. Find the monthly salary.
Let n >= 0 be an integer, and for each 0 R be the function P(x) := the sum from i=0 to n of c_i x^i such a function is known as a polynomial of one variable
Describe how you use factoring in your everyday life Give an example of a math problem that offers a solution to the real life application.
Describe how geologists assess relative and absolute time. Be sure to mention all of the principles related to relative timing and provide a brief description of each.
An irrigation sprinkler in a field of lettuce sprays water over a distance of 25 feet as it rotates through an angle of 155°. What area of the field receives water? If necessary, round the answer to two decimal places.
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