12. Simple Interest 5. For a simple interest rate of \( 6 \% \) p.a., we want to calculate the number of quarters needed for \( \$ 2968.00 \) to be invested to earn \( \$ 178.08 \) in interest. 5a First calculate the number of years, \( T \), taken to earn the interest. Write your answer correct to two decimal places. Enter each line of working as an equation. ( \( T=1 \) 5b Now find the number of quarters taken to earn the interest.

To find the time taken to earn \( \$ 178.08 \) in interest using simple interest, we can use the formula for simple interest: \[ I = P \times r \times T \] Where: - \( I = 178.08 \) (interest earned) - \( P = 2968.00 \) (principal amount) - \( r = 0.06 \) (annual interest rate of \( 6\% \)) 5a First, we rearrange the formula to solve for \( T \): \[ T = \frac{I}{P \times r} \] Substituting the values in: \[ T = \frac{178.08}{2968.00 \times 0.06} \] Calculating the denominator: \[ T = \frac{178.08}{178.08} \] Now, dividing gives: \[ T = 1 \text{ (year)} \] 5b To find the number of quarters: Since 1 year equals 4 quarters: \[ \text{Number of quarters} = 1 \text{ year} \times 4 \text{ quarters/year} = 4 \text{ quarters} \] Thus, it takes 4 quarters to earn the interest.