Add one term to the polynomial expression 14x^19 – 9x^15 + 11x^4 + 5x^2 + 3 to make it into a 22nd degree polynomial

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Question:

Add one term to the polynomial expression 14x^19 – 9x^15 + 11x^4 + 5x^2 + 3 to make it into a 22nd degree polynomial

Answer:

The required polynomial to a 22nd degree is ?f=P(x)%3Dx%5E%7B22%7D%2B14x%5E%7B19%7D%20

Given the polynomial function, ?f=14x%5E%7B19%7D%20,, we are to add one term to the polynomial to make it into a 22nd-degree polynomial.

Note the highest and leading power of the variable of any function is the degree of such function.

To convert the given polynomial to a 22nd-degree function, we will simply add a variable term x with a degree of 22 to have:

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?f=P(x)%3Dx%5E%7B22%7D%2B14x%5E%7B19%7D%20

Hence the required polynomial to a 22nd degree is ?f=P(x)%3Dx%5E%7B22%7D%2B14x%5E%7B19%7D%20

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