For the following function, find the half-life, then rewrite it in the form P=P0er⁢t. Assume t...

Phosphorus-32 (P-32) has a half-life of 14.2 days. If 450 g of this substance are present...

Phosphorus-32 (P-32) has a half-life of 14.2 days. If 450 g of this substance are present initially, find the amount Q(t) present after t days. (Round your growth constant to four decimal places.) Q(t) = What amount will be left after 17.6 days? (Round your answer to three decimal places.)

The half-life of cesium-137 is 30 years. Suppose we have a 13-g sample. (a) Find a...

The half-life of cesium-137 is 30 years. Suppose we have a 13-g sample. (a) Find a function m(t) = m02−t/h that models the mass remaining after t years. m(t) = ____ (b) Find a function m(t) = m0e-rt that models the mass remaining after t years. (Round your r value to four decimal places.) m(t) = _____ (c) How much of the sample will remain after 71 years? (Round your answer to one decimal place.) ____ g (d) After how...

the calculator provided to solve the following problems. Consider a t distribution with 2 degrees P(-1.70<...

the calculator provided to solve the following problems. Consider a t distribution with 2 degrees P(-1.70< t< 1.70) Round your to at three places decimal places Consider a t distribution with 11 degrees of freedom. Find the value of such that P (t<c)=0.10 round your answer to at least three decimal places

1. Put the following function in the form P=P0ekt. P=8(1.3)^t P=11(1.3)^t 2. For  f(x)=(4x−1)3, find the equation...

1. Put the following function in the form P=P0ekt. P=8(1.3)^t P=11(1.3)^t 2. For  f(x)=(4x−1)3, find the equation of the tangent line at x=0 and x=2.

Use the calculator provided to solve the following problems. a. Consider a t distribution with 15...

Use the calculator provided to solve the following problems. a. Consider a t distribution with 15 degrees of freedom. Compute P(t>=-1.50) . Round your answer to at least three decimal places. b. Consider a t distribution with 12 degrees of freedom. Find the value of such that p(-c<t<c)=0.90 . Round your answer to at least three decimal places. P(t   >=      -1.50)= c=

Use the Student's t distribution to find tc for a 0.95 confidence level when the sample...

Use the Student's t distribution to find tc for a 0.95 confidence level when the sample is 26. (Round your answer to three decimal places.) Use the Student's t distribution to find tc for a 0.90 confidence level when the sample is 12. (Round your answer to three decimal places.)

Radium decays exponentially; it has a half-life of 1,600 years. Find a formula for the amount,...

Radium decays exponentially; it has a half-life of 1,600 years. Find a formula for the amount, q(t), remaining from 70 mg of pure radium after t years. q(t) = After how many years will there be 20 mg left? (Round your answer to the nearest year.) yr

The half-life of the radioactive material cesium-137 is 30 years. Suppose we have a 180-mg sample....

The half-life of the radioactive material cesium-137 is 30 years. Suppose we have a 180-mg sample. (a) Write a formula that gives the mass that remains after t years. (Round the relative growth rate to four decimal places.) A(t) =   (b) How much of the sample remains after 100 years? (Round your answer to two decimal places.) mg (c) After how long will only 1 mg remain? (Round your answer to one decimal place.) years (d) At what rate is...

If g(t) is not everywhere zero, assume that the solution is of the form y= A(t)...

If g(t) is not everywhere zero, assume that the solution is of the form y= A(t) exp[- the integral of p(t)dt] 1. Where A is now a function of t. By substituting for y in the given differential equation, show that A(T) must satisfy the condition A'(t)= g(t)exp[ of the integral p(t)dt] The equation we will be using is y' + p(t)y= g(t) a) Find the final answer b) Find y Please use good handwriting and show as many steps...

Suppose a population P(t) satisfies dP/dt = 0.8P − 0.001P2    P(0) = 50 where t is measured...

Suppose a population P(t) satisfies dP/dt = 0.8P − 0.001P2    P(0) = 50 where t is measured in years. (a) What is the carrying capacity? ______ (b) What is P'(0)? P'(0) = ______ (c) When will the population reach 50% of the carrying capacity? (Round your answer to two decimal places.) _____yr Please show all work neatly, line by line, and justify steps so that I can learn. Thank you!