To solve the inequalities \( x + 1 \geq 5 \) and \( 2x \geq 4 \), we will solve each inequality separately and then find the intersection of their solution sets.
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Solve the first inequality: \[ x + 1 \geq 5 \] Subtract 1 from both sides: \[ x \geq 4 \]
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Solve the second inequality: \[ 2x \geq 4 \] Divide both sides by 2: \[ x \geq 2 \]
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Combine the solutions: The solution for the first inequality is \( x \geq 4 \) and for the second is \( x \geq 2 \). The combined solution set must satisfy both conditions, which is determined by the more restrictive inequality.
Thus, the solution set is \( x \geq 4 \).
In interval notation, the solution set is: \[ [4, \infty) \]