The following situation can be modeled by a linear function. Write an equation for the linear...

6. Then number of infected individuals in a population can be modeled with the following function:...

6. Then number of infected individuals in a population can be modeled with the following function: 20 I(t) = 10 − √ t, where t is measured in days. (a) Using linear approximation, estimate the number of in- fected individuals at time t = 18. You should linearize around the point t = 16. (b) Starting at t = 16, use linear approximation to estimate the number of newly infected individuals over the next 0.5 days.

2. The growth of cable television between 1978 and 1994 can be modeled by the following...

2. The growth of cable television between 1978 and 1994 can be modeled by the following logistic function: S(t) = 65/ 1+23e^(-0.214t) where S(t) is the number of cable TV subscribers (in millions) t years after 1970. a. Determine the number of cable TV subscribers in 1984 according to this model. b. Determine S′(t) using the function above and the derivative rules you know. c. Use this function to determine the rate at which the number of cable TV subscribers...

The populations P (in thousands) of a particular county from 1971 through 2014 can be modeled...

The populations P (in thousands) of a particular county from 1971 through 2014 can be modeled by P = 73.5e0.0326t where t represents the year, with t = 1 corresponding to 1971. (a) Use the model to complete the table. (Round your answers to the nearest whole number.) Year Population 1980 1990 2000 2010 (b) According to the model, when will the population of the county reach 380,000?

Use the Laplace Transform to construct a second-order linear differential equation for the following function: f(t)...

Use the Laplace Transform to construct a second-order linear differential equation for the following function: f(t) = u(t−π)e(5t)sin(2t) where u(t) is the Heaviside unit step function.

The spread of a virus can be modeled by the following function where N is the...

The spread of a virus can be modeled by the following function where N is the number of people infected (in hundreds) and t is the time (in weeks). (Round your answers to three decimal places.) N = −t3 + 5t2, 0 ≤ t ≤ 5 (a) What is the maximum number of people projected to be infected? hundred people (b) When will the virus be spreading most rapidly? weeks

Use the following general linear supply function to answer the next question: Qs = 60 +...

Use the following general linear supply function to answer the next question: Qs = 60 + 8P - 4PI + 20F, where Qs is the quantity supplied of the good, P is the price of the good, PI is the price of an input, and F is the number of firms producing the good. When PI = $20 and F = 60, the INVERSE supply function is

The equation below represents a      linear demand curve. Use the grid (right) for your plots. Write...

The equation below represents a      linear demand curve. Use the grid (right) for your plots. Write all derivations in the space below. l) Plot the demand function on the top set of axes. Your demand function is: Qx = 80,000-200Px 2) The price function is the inverse of the demand function. Write this inverse below. 3) Use the price function to obtain the total revenue function (TR). Write the TR function below. You will plot TR on the lower set...

1. Linear Equation Applied to Supply and Demand Find the point of intercept of following demand...

1. Linear Equation Applied to Supply and Demand Find the point of intercept of following demand and supply function for good 1 given by: QD1 = 10 - 2P1 QS1 = -3 + 2P1 Where QD1, QS1 denote the quantity demanded and quantity supplied. P1 represents price of good 1 respectively. 1.1 Determine the equilibrium price and quantity for this one good model.        1.2 ​​​​​​​Sketch the graph for Qdand Qsfunctions and point out the equilibrium price and quantity.   

1). Find the consumer and producer surpluses by using the demand and supply functions, where p...

1). Find the consumer and producer surpluses by using the demand and supply functions, where p is the price (in dollars) and x is the number of units (in millions). Demand Function Supply Function p = 410 − x p = 160 + x consumer surplus $_________ millionsproducer surplus $ ________millions 2) Find the consumer and producer surpluses by using the demand and supply functions, where p is the price (in dollars) and x is the number of units (in...

Use the following general linear supply function: Qs= 40 + 6P − 8PI + 10F where...

Use the following general linear supply function: Qs= 40 + 6P − 8PI + 10F where Qs is the quantity supplied of the good, P is the price of the good, PI is the price of an input, and F is the number of firms producing the good. Suppose PI = $40, F = 50, and the demand function is Qd= 700 − 6P, then if government sets a price of $50 what will be the result?