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Solving the Equation: 0.2x(5x-8) + 3.6 = x(x-0.7)
This article will guide you through the steps of solving the given equation: 0.2x(5x-8) + 3.6 = x(x-0.7)
Step 1: Expand the Parentheses
First, we need to distribute the terms outside the parentheses:
- 0.2x(5x-8): This becomes 1x² - 1.6x
- x(x-0.7): This becomes x² - 0.7x
Our equation now looks like this: 1x² - 1.6x + 3.6 = x² - 0.7x
Step 2: Simplify by Combining Like Terms
We can simplify by moving all the terms to one side of the equation:
- Subtract x² from both sides: -1.6x + 3.6 = -0.7x
- Add 1.6x to both sides: 3.6 = 0.9x
Step 3: Isolate the Variable
Now, we need to isolate x by dividing both sides by 0.9:
- 3.6 / 0.9 = x
Step 4: Calculate the Solution
Performing the division, we find the solution:
- x = 4
Conclusion
Therefore, the solution to the equation 0.2x(5x-8) + 3.6 = x(x-0.7) is x = 4. You can verify this by substituting x = 4 back into the original equation and confirming that both sides are equal.