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

The population P(t) of bacteria grows according to the logistics equation dP/dt=P(12−P/4000), where t is in...

The population P(t) of bacteria grows according to the logistics equation dP/dt=P(12−P/4000), where t is in hours. It is known that P(0)=700. (1) What is the carrying capacity of the model? (2) What is the size of the bacteria population when it is having is fastest growth?

A $1000 investment grows according to the function ?(?) = 1000(1.035)2t , where ? is the...

A $1000 investment grows according to the function ?(?) = 1000(1.035)2t , where ? is the amount of the investment after t years. At what rate is the investment growing after 5 years? *REQUIRES FINDING THE DERIVATIVE OF THE FUNCTION ABOVE*

1.The half-life of polonium (210Po) is 143 days. If you have 21 grams now, how much...

1.The half-life of polonium (210Po) is 143 days. If you have 21 grams now, how much wil you have at the end of 2 years? (Give your answer correct to 3 decimal places.)   grams 2.A colony of bacteria grows according to the uninhibited growth model. Suppose there is 9 g of bacteria on Monday and 27 g of bacteria on Wednesday. (a) Find a function that gives the amount of bacteria in grams after t days. (Use the variable a...

1. A population grows according to an exponential growth model. The initial population is P0=12, and...

1. A population grows according to an exponential growth model. The initial population is P0=12, and the common ratio is r=1.45 Then: P1 = P2 = Find an explicit formula for Pn. Your formula should involve n. Pn =    Use your formula to find P9 P9= Give all answers accurate to at least one decimal place 2. Assume there is a certain population of fish in a pond whose growth is described by the logistic equation. It is estimated that...

Revisiting Exponential Growth At time t = 0 a population has size 1000. Suppose it grows...

Revisiting Exponential Growth At time t = 0 a population has size 1000. Suppose it grows exponentially, so that at time t (years) it has size S(t) = 1000a t for some a and all t > 0. a) Suppose that it doubles in size every 8 years. What is a? b) After how many years is the population 32 000? c) What is its instantaneous growth rate (individuals per year) at t = 10? d) What is its instantaneous...

Consider a farmer that grows hazelnuts using the production q = AL1/3, where q is the...

Consider a farmer that grows hazelnuts using the production q = AL1/3, where q is the amount of hazelnuts produced in a year (in tonnes), L represents the number of labor hours employed on the farm during the year, and A is the size of orchard which is fixed. The annual winter pruning of the orchard cost $1200, and is already paid by the farmer. The hourly wage rate for labor is $12. a) Derive the equation for the marginal...

strontium 90 is a radioactive material that decays according to the function A(t)=Aoe^0.0244t ,where So is...

strontium 90 is a radioactive material that decays according to the function A(t)=Aoe^0.0244t ,where So is the initial amount present and A is the amount present at time t (in year). assume that a scientist has a sample of 800 grams of strontium 90. a)what is the decay rate of strontium 90? b)how much strontium 90 is left after 10 years? c)when Will only 600 grams of strontium 90 be left? d)what is the half life of strontium 90?

6.7 The production function Q=KaLb where 0≤ a, b≤1 is called a Cobb-Douglas production function. This...

6.7 The production function Q=KaLb where 0≤ a, b≤1 is called a Cobb-Douglas production function. This function is widely used in economic research. Using the function, show the following: a. The production function in Equation 6.7 is a special case of the Cobb-Douglas. b. If a+b=1, a doubling of K and L will double q. c. If a +b < 1, a doubling of K and L will less than double q. d. If a +b > 1, a doubling...

A6-9. Suppose the aggregate production function for an economy is given by Y* = (T+H)K1/2L1/2, where...

A6-9. Suppose the aggregate production function for an economy is given by Y* = (T+H)K1/2L1/2, where Y* is potential GDP, T is the average level of technology, H is the average level of human capital, K is the capital stock and L is the labour force. Assume initially that both T and H equal 5, and that both K and L equal 64. Assume that the population grows at the same rate as any growth in the labour force so...

Question #1: The Basic Solow Model Consider an economy in which the population grows at the...

Question #1: The Basic Solow Model Consider an economy in which the population grows at the rate of 1% per year. The per worker production function is y = k6, where y is output per worker and k is capital per worker. The depreciation rate of capital is 14% per year. Assume that households consume 90% of their income and save the remaining 10% of their income. (a) Calculate the following steady-state values of (i) capital per worker (ii) output...