The set of values that makes the inequality βh>β6 true are; β5.9,β5,β1,0,1,5,5.9.
Given the inequality is βh>β6
When a polynomial of degree 1 is compared to another algebraic expression of degree less than or equal to 1, this is known as a linear inequality, which is an inequality involving at least one linear algebraic expression. It's important to remember that if p < q, then p must be a number that is unambiguously less than q. If p β€ q, then p is a number that is strictly smaller than q or exactly equal to q. The same is true for the final two inequality signs > (greater than)
The equivalent inequality can be gotten as follows:
βh>β6
By dividing both sides by β1, we get:
h<6
As a result, the values mentioned above represent the set of values that meet the inequality.
Learn more about Inequality equations here:
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Your question was incomplete. Please find the missing content below.
Select the values that make the inequality -h β₯ β6 true.
Then write an equivalent inequality, in terms of h.
