Select the answer that best completes the given statement. If \( n \) is a counting number, \( \mathrm{b}^{n} \), read b times \( n \) b decreased by \( n \) \( n \) to the bth power \( n \) b to the nth power \( n \) b divide \( n \)

If \( n \) is a counting number, \( \mathrm{b}^{n} \) is read as "b to the nth power." This means you are multiplying the number \( b \) by itself \( n \) times. For example, if \( b = 2 \) and \( n = 3 \), then \( 2^{3} = 2 \times 2 \times 2 = 8 \). This notation is widely used not just in pure mathematics but also in various fields such as computer science, physics, and statistics where exponential growth or scaling is involved. Understanding powers and exponents is critical for grasping concepts like algorithms' time complexity or population growth models!