131 Calculate the amount that he will receive after 5 years. 3 \( \qquad \) \( \qquad \) \( \qquad \) \( \qquad \) \( \qquad \) 13.2 How much interest did he earn? \( \qquad \) \( \qquad \) \( \qquad \) \( \qquad \) Calculate without using a calculator: \( 14.1-(-4)^{2}-\sqrt{6^{2}}-(-2)^{3} \) \( \qquad \) \( \qquad \) \( \qquad \) \( \qquad \) \( 14.2 \sqrt{-4 \times-9+8^{2}} \) 3 \( \qquad \) \( \qquad \) \( \qquad \) \( \qquad \) \( 14.3 \frac{6+3 \times 7}{-3} \) 2 \( \qquad \) \( \qquad \) \( \qquad \)

Imagine a world where money grows on trees! Well, it's not quite that simple, but let's talk about interest. When you deposit money, often a certain percentage is added over time, known as interest. If you place $131 into a savings account with a fixed interest rate, after 5 years, you can earn a good chunk of change without lifting a finger! The magic of compounding can help your money work for you, so always explore your options! Now, let's unravel the math mystery you'll face. For that expression, it’s all about tackling operations one step at a time—think of it like a delicious layered cake! Start with the exponent, then the square root, followed by multiplication and finally handle addition and subtraction in sequence. If you patiently navigate this maze, you'll emerge with the final answer and feel like a math wizard!