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

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 bacteria culture starts with 1000 bacteria and grows at an exponential rate. After 3 hours...

A bacteria culture starts with 1000 bacteria and grows at an exponential rate. After 3 hours there will be 3000 bacteria. Give your answer accurate to at least 4 decimal places (a) Express the population P after t hours as a function of t. (b) What will be the population after 2 hours? (c) How long will it take for the population to reach 1310?

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?

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...

suppose the number of employees of a start up is given by N=30/5+ 40t/2t where t...

suppose the number of employees of a start up is given by N=30/5+ 40t/2t where t is the number of month after the company is organised. a. does the graph of this function have a vertical asymptote on (-10,10)? where? b. does the graph of this function have a vertical asymptote for values of t in this application? c.does the graph of this function have a horizontal asymptote? where? d. what is the maximum number of employee predicted by this...

Consider a version of the Solow model where population grows at the constant rate ? >...

Consider a version of the Solow model where population grows at the constant rate ? > 0 and labour efficiency grows at rate ?. Capital depreciates at rate ? each period and a fraction ? of income is invested in physical capital every period. Assume that the production function is given by: ?t = ?ta(?t?t )1-a Where ??(0,1), ?t is output, ?t is capital, ?t is labour and ?t is labour efficiency. a. Show that the production function exhibits constant...

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?

Problem 1.10 You deposit $5,000 in an account that earns 5% interest compounded annually in years...

Problem 1.10 You deposit $5,000 in an account that earns 5% interest compounded annually in years 1 and 2, and thereafter a continuous rate δ(t) = 2/(t + 1) (t ≥ 0). What is the value of the account after 5 years? Problem 1.11 Suppose an initial investment of $100 grows according to the accumulated amount function A(t) = 100(1 + 0.05t) (t ≥ 0). (a) Find the effective rate of interest earned during the 5th year i5. (b) Find...

The polynomial function I(t)=-0.1t^2+1.5t represents the yearly income (or loss) from a real estate investment, where...

The polynomial function I(t)=-0.1t^2+1.5t represents the yearly income (or loss) from a real estate investment, where t is time in years. After what year does income begin to decline?

suppose the number of employees of a start up is given by N=30 + 40t /5+2t...

suppose the number of employees of a start up is given by N=30 + 40t /5+2t where t is the number of month after the company is organised. a. does the graph of this function have a vertical asymptote on (-10,10)? where? b. does the graph of this function have a vertical asymptote for values of t in this application? c.does the graph of this function have a horizontal asymptote? where? d. what is the maximum number of employee predicted...