Answer :
The best step to do next to solve the equation by completing the square is 9(x^2 + 6x+9) = 31
Given the quadratic equation given as 9x^2 + 49x = 22 - 5x. To solve using the completing the square method, we will follow the steps;
Step 1: Given
- 9x^2 + 49x = 22 - 5x
Step 2: Add 5x to both sides of the equation:
- 9x^2 + 49x + 5x = 22 - 5x + 5x
- 9x^2 + 54x = 22
Step 3: Factor out 9 from the expression to have:
- 9(x^2 + 6x) = 22
Step 4: Complete the square of the expression in parenthesis.
Add half of the square of the coefficient of x to both sides:
9(x^2 + 6x + (6/2)^2) = 22 + (6/2)^2
9(x^2 + 6x+ 3^2) = 22 + 3^2
9(x^2 + 6x+9) = 22+9
9(x^2 + 6x+9) = 31
Hence the best step to do next to solve the equation by completing the square is 9(x^2 + 6x+9) = 31
Learn more on completing the square here: https://brainly.com/question/1596209