To determine the solution set for the equations \( 2x - 3 = 5 \) and the inequality \( 5x + 3 > -12 \), we will solve each one separately and then find the intersection of their solutions.
Step 1: Solve the equation \( 2x - 3 = 5 \)
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Add 3 to both sides: \[ 2x - 3 + 3 = 5 + 3 \] \[ 2x = 8 \]
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Divide by 2: \[ x = \frac{8}{2} = 4 \]
So, the solution to the equation \( 2x - 3 = 5 \) is \( x = 4 \).
Step 2: Solve the inequality \( 5x + 3 > -12 \)
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Subtract 3 from both sides: \[ 5x + 3 - 3 > -12 - 3 \] \[ 5x > -15 \]
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Divide by 5: \[ x > -3 \]
So, the solution to the inequality \( 5x + 3 > -12 \) is \( x > -3 \).
Step 3: Find the intersection of the solutions
We have:
- From the equation: \( x = 4 \)
- From the inequality: \( x > -3 \)
Now we check if the solution from the equation \( x = 4 \) satisfies the inequality \( x > -3 \):
- Since \( 4 > -3 \) holds true, \( x = 4 \) is indeed within the range of \( x > -3 \).
Conclusion
The intersection of the solutions is: \[ { 4 } \]
Thus, the solution set of the given equation and inequality is \( { 4 } \).