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Classify the function as linear or quadratic and identify the quadratic, linear, and constant terms. y=-3x²-29x+30
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Classify the function as linear or quadratic and identify the quadratic, linear, and constant terms. y=-3x²-29x+30

User Ryan Miller
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1 Answer

3 votes

Answer:

For this problem we have the following function given:


y= -3x^2 -29x +30

In order to clasify the function as linear or quadratic we need to see the higher exponent for x in the equation and for this case we see that the higher exponent is 2 since we have in the first term
-3x^2. So then we can classify this equation as quadratic

Quadratic term: -3

Linear term: -29

Constant term: 30

Explanation:

For this problem we have the following function given:


y= -3x^2 -29x +30

In order to clasify the function as linear or quadratic we need to see the higher exponent for x in the equation and for this case we see that the higher exponent is 2 since we have in the first term
-3x^2. So then we can classify this equation as quadratic

Quadratic term: -3

Linear term: -29

Constant term: 30

User Mcastle
by
7.1k points
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