The growth rate of a colony of ants is given by the formula 10t(1+t2)2 where t...

Use the formula N = t2 - t /2 where N is the number of basketball...

Use the formula N = t2 - t /2 where N is the number of basketball games that must be scheduled in a league with t teams if each team is to play every other team once. A league has 66 games scheduled. How many teams are in the league if each team plays every other team once? _____teams

1.) A colony of bacteria grows in a controlled environment according to the function Q(t)=12000(1.015)^t ,...

1.) A colony of bacteria grows in a controlled environment according to the function Q(t)=12000(1.015)^t , where t is measured in weeks. a.) What is the weekly growth rate (as a percentage) of the bacteria population? b.) What is the annual growth rate (as a percentage) of the bacteria population? (Use the standard of 52 weeks in a year).

a) Given s(t)= -10t^2+2t+5 where s(t) is the position of an object in feet and the...

a) Given s(t)= -10t^2+2t+5 where s(t) is the position of an object in feet and the variable “t” is in seconds, find each of the following: A) Function for the velocity B) Function for the Acceleration C) The Velocity and Acceleration at t = 2 seconds b) A rectangle is to have a perimeter of 60 ft. Find the dimensions of the rectangle such that the dimensions yield maximum area. (please show all work possible)

In a certain culture where the rate of growth is proportional to the number present, the...

In a certain culture where the rate of growth is proportional to the number present, the number triples in 3 days. If at the end of 7 days there are 10 million bacteria present in the culture how many were present initially?

Suppose that a colony of mice started with 50 mice at the beginning of the year,...

Suppose that a colony of mice started with 50 mice at the beginning of the year, and 4 months later the colony grew exponentially to 100 mice. Let P(t) describe the amount of mice after t months pass from the beginning of the year. (a) 5 pts Write a differential equation that describes the growth rate of the colony in terms of the population size. Use k as the growth constant. (b) 10 pts Find the growth constant k for...

Find the third derivative of the given function. g (t) = ( (1/2)t2 -5)5 g''' (t)...

Find the third derivative of the given function. g (t) = ( (1/2)t2 -5)5 g''' (t) = ?

The rate of growth of the population of a city is predicted to be dp/dt =...

The rate of growth of the population of a city is predicted to be dp/dt = 1000t^1.08 where P is the population at time T and T is measured in years from the present.   a) What is the predicted rate of growth 5 years from the present? b) what is the population 5 years from the present? No current population was given

Consider the following vector function. r(t) = <9t,1/2(t)2,t2> (a) Find the unit tangent and unit normal...

Consider the following vector function. r(t) = <9t,1/2(t)2,t2> (a) Find the unit tangent and unit normal vectors T(t) and N(t). (b) Use this formula to find the curvature. κ(t) =

Water leaks from a tank at a rate of 115−2?2‾‾‾‾‾‾‾‾√115−2t2 liters/ hour, where ?t is the...

Water leaks from a tank at a rate of 115−2?2‾‾‾‾‾‾‾‾√115−2t2 liters/ hour, where ?t is the number of hours after 7am. How much water is lost between 9:30 am and 11:30 am?

5) If the instantaneous rate of change of the population can be given by 50 t...

5) If the instantaneous rate of change of the population can be given by 50 t 2 − 100 t 3 2 (measured in individuals per year) and the initial population is 25,000 people, find a function to describe the population based on the number of years, t. What would be the population after 20 years?