To solve the inequality, we will simplify the expression:
2t + 8 ≥ -4(t + 1)
First, distribute -4 to (t + 1):
2t + 8 ≥ -4t - 4
Next, combine like terms by adding 4t to both sides of the inequality:
6t + 8 ≥ -4
Subtract 8 from both sides of the inequality:
6t ≥ -12
Finally, divide both sides by 6 to isolate t:
t ≥ -2
Therefore, t is greater than or equal to -2.
2t + 8 more than or equal to -4 (t + 1)
t more than or equal to (blank)
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