SAT Exponential Growth and Decay Practice Questions

To find the value of \( C(4) \), substitute \( t = 4 \) into the function: \( C(4) = 500(1.1)^{4/2} + 200(0.9)^{4/2} = 500(1.1)^2 + 200(0.9)^2 \). Simplifying, \( (1.1)^2 = 1.21 \) and \( (0.9)^2 = 0.81 \). Therefore, \( C(4) = 500 \times 1.21 + 200 \times 0.81 = 605 + 162 = 767 \).

We need to solve for \( t \) in \( 10000(0.95)^{t/3} = 5000 \). Dividing both sides by 10000 gives \( (0.95)^{t/3} = 0.5 \). Taking the natural logarithm of both sides, we get \( \ln((0.95)^{t/3}) = \ln(0.5) \). Using properties of logarithms, \( \frac{t}{3} \ln(0.95) = \ln(0.5) \). Solving for \( t \) gives \( t = \frac{3 \ln(0.5)}{\ln(0.95)} \approx 20.25 \).

To find the size after 4 hours, we evaluate \( B(4) \). Substituting \( t = 4 \) into the function gives \( B(4) = 1000(2)^{4/2} = 1000(2)^2 = 1000 \times 4 = 4000 \).

To find the investment value after 2 years, we calculate \( I(2) \). Substituting \( t = 2 \) into the function gives \( I(2) = 5000(1.05)^{3 \cdot 2} = 5000(1.05)^6 \). Using a calculator or approximation, \( (1.05)^6 \approx 1.3401 \), so \( I(2) \approx 5000 \times 1.3401 = 6700.50 \).

To find the amount after 1 unit of time, we evaluate \( R(1) \). Substituting \( t = 1 \) into the function gives \( R(1) = 1000(0.9)^{2 \cdot 1} = 1000(0.9)^2 = 1000 \times 0.81 = 810 \).

Calculate \( p(0) \). Plugging \( 0 \) into the function results in \( p(0) = 2000(0.8)^0 \). Since \( (0.8)^0 = 1 \), the population is \( 2000 \times 1 = 2000 \).

To find the initial size, evaluate \( k(0) \). Thus, \( k(0) = 500(1.5)^0 \). Since \( (1.5)^0 = 1 \), the answer is \( 500 \times 1 = 500 \).

Substitute \( y = 0 \) into the equation to get \( j(0) = 800(1.25)^0 \). As \( (1.25)^0 = 1 \), the value is \( 800 \times 1 = 800 \).

We need to find \( h(1) \). Plugging \( 1 \) into the function yields \( h(1) = 600(0.9)^1 \). This simplifies to \( 600 \times 0.9 = 540 \).

To find the initial value, we calculate \( g(0) \). Substituting \( 0 \) for \( x \) gives \( g(0) = 300(0.75)^0 \). Since \( (0.75)^0 = 1 \), the expression simplifies to \( 300 \times 1 = 300 \).