1. Select all the values of x that will make the following inequality true.
2(3x − 6) ≥ 5x − 10
Chat
x = -5
x = 1
x = 0
x = 2
x = 13
x = 7
Please help I've been stuck on this problem for a long time at least just give me 1 example so i can plug it in with the rest of the answer choices( This isen't homework its a lesson)
again?
See your first post, or the related questions below
To determine which values of x make the inequality 2(3x - 6) ≥ 5x - 10 true, we will solve it step by step. Here's how:
1. Distribute the 2 on the left side of the inequality:
6x - 12 ≥ 5x - 10
2. Move all the terms containing x to one side of the inequality, and the constants to the other side:
6x - 5x ≥ -10 + 12
Simplify:
x ≥ 2
So, any values of x greater than or equal to 2 will make the inequality true. Therefore, x = 2, x = 13, and x = 7 are all examples of x values that satisfy the inequality.
To solve an inequality like this, you need to isolate the x variable and simplify the expression. Then, you compare the result to determine the range of x values that satisfy the inequality.