jaelyn0514
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Review the graph of 2x – 7 – 3 ≥ y.

On a coordinate plane, a curve goes through (0, negative 3) and increases up through (8.5, 0) and (10, 5). Everything below the line is shaded and is labeled 2 Superscript x minus 7 Baseline minus 3 greater-than-or-equal-to y.

What is the least integer value that satisfies the inequality 2x – 7 ≥ 3?

7
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Review the graph of 2x 7 3 y On a coordinate plane a curve goes through 0 negative 3 and increases up through 85 0 and 10 5 Everything below the line is shaded class=

Respuesta :

ashishdwivedilVT

The least integer value that satisfies the inequality   [tex]2^{x-7} - 3[/tex] ≥ y is 7.

What is Exponential function?

Exponential function, as its name suggests, involves exponents. But note that, an exponential function has a constant as its base and a variable as its exponent but not the other way round.

Here, In the given function

            Least possible value of 2ˣ⁻⁷ is 1

                     2ˣ⁻⁷ = 2⁰

    On comparing both sides, we get

                 x-7 = 0

                  x = 7

Thus, The least integer value that satisfies the inequality   2ˣ⁻⁷-3≥ y is 7.

Learn more about Exponential function from:

https://brainly.com/question/14355665

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