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Which values from this set {βˆ’36, βˆ’32, βˆ’16, 0, 4, 16} satisfy this inequality? βˆ’14x+6β‰₯14 βˆ’32, βˆ’16, 0, 4, and 16 only 0, 4, and 16 only βˆ’36, βˆ’32, and βˆ’16 only βˆ’36 and βˆ’32 onlyWhich values from this set {βˆ’36, βˆ’32, βˆ’16, 0, 4, 16} satisfy this inequality? βˆ’14x+6β‰₯14 βˆ’32, βˆ’16, 0, 4, and 16 only 0, 4, and 16 only βˆ’36, βˆ’32, and βˆ’16 only βˆ’36 and βˆ’32 only

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abidemiokin

Answer:

Step-by-step explanation:

Given the inequality βˆ’14x+6β‰₯14, we are to find the range of x that will make the inequality true.

Given βˆ’14x+6β‰₯14

Subtract 6 from both sides.

βˆ’14x+6-6β‰₯14-6

-14xβ‰₯8

-7xβ‰₯4

Multiply both sides by -1

-(-7)x≀-4

7x ≀ -4

x≀-4/7

This shows that the values of x is always less than or equal to -0.57

Hence the values less tan the value of x in the inequality are -36, -32 and -16

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