(2%5E3x-7)%3D2%5E25.jpeg "(2^2x+2)(2^3x-7)=2^25")
Solving the Equation (2^(2x+2))(2^(3x-7)) = 2^25
This equation involves exponents and requires understanding of exponent rules to solve. Here's how to break it down:
1. Simplify using exponent rules
- Product of powers: When multiplying powers with the same base, add the exponents. Therefore:
- (2^(2x+2))(2^(3x-7)) = 2^(2x+2 + 3x-7) = 2^(5x-5)
2. Set up the equation
Now we have:
- 2^(5x-5) = 2^25
3. Solve for x
- Equate the exponents: Since the bases are the same, we can equate the exponents:
- 5x - 5 = 25
- Solve for x:
- 5x = 30
- x = 6
Solution
Therefore, the solution to the equation (2^(2x+2))(2^(3x-7)) = 2^25 is x = 6.