# change of Base Formula

Exam 4 Name: ________________________________ Show all your work for full credit: 100 points Part 1: 65 points (in class) Part 2: 35 points (take home) Part 1: 1 Q1. (9 points) A) Write the equation 64β1/2 = 8 in logarithmic form. B) Use the change of Base Formula to evaluate πππ2 6 C) Use the Laws of Logarithms to expand the expression. 4π₯ 2 log ( π¦3 ) Q2. (8 points) Solve the equation. Find the exact solution and rounded to two decimal places. 31βπ₯ = 52π₯ 1 Exam 4 Name: ________________________________ Show all your work for full credit: 100 points Q3. (8 points) Solve the equation. Find the exact solution. πππ2 (π₯ β 7) + πππ2 π₯ = 3 Q4. (8 points) Suppose that $8,000 is invested in a saving account paying 5% interest per year. How long will it take for the amount in the account to grow to $16,000 if interest is compounded quarterly? 2 Exam 4 Name: ________________________________ Show all your work for full credit: 100 points Q5. (10 points) a) Sketch the graph of the function. State its domain, range in the interval notation. State its asymptote. Show the π₯ β and π¦ βintercepts on the graph. π(π₯) = 3π₯ + 2 3 Exam 4 Name: ________________________________ Show all your work for full credit: 100 points Q6. (10 points) Radiumβ221 has a half-life of 30s. Suppose we have a 300 g sample. a) Find a formula for the mass remaining after t seconds. b) How much of the sample remains after 200 seconds? c) After how long will only 20 g remain? 4 Exam 4 Name: ________________________________ Show all your work for full credit: 100 points Q7. (12 points) a) b) c) d) e) Sketch the graph of the function. State its domain, range in the interval notation State its asymptote. Show the π₯ β and π¦ βintercepts on the graph. Graph π β1 (π₯) on the same graph as part (a) Find π β1 (π₯) π(π₯) = πππ2 (π₯ + 4) + 2 5

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