Math Problem Statement

Escribir b^5 · b^2 · b sin exponentes.

Solution

The problem asks to express the expression b5b2bb^5 \cdot b^2 \cdot b without using exponents.

First, recall the properties of exponents. When multiplying terms with the same base, you add their exponents. Thus, we can combine the powers of bb:

b5b2b=b5+2+1=b8b^5 \cdot b^2 \cdot b = b^{5+2+1} = b^8

So, the answer is simply:

b8b^8

If you need more details or have any questions, feel free to ask!

Here are some related questions to help you expand your understanding:

  1. What is the rule for multiplying exponents with the same base?
  2. How do you simplify an expression like babbbcb^a \cdot b^b \cdot b^c?
  3. What is the general formula for multiplying several exponents with the same base?
  4. How would you express b3b4b^3 \cdot b^{-4} without exponents?
  5. Can the rule for exponents be applied to negative numbers or fractions?

Tip: Always check if you can simplify expressions by using exponent rules first, as it can make your calculations much easier!

Ask a new question for Free

By Image

Drop file here or Click Here to upload

Math Problem Analysis

Mathematical Concepts

Exponentiation
Multiplication of Exponents

Formulas

When multiplying powers with the same base, add the exponents: a^m · a^n = a^{m+n}

Theorems

Exponent rule for multiplication with the same base

Suitable Grade Level

Grades 7-9