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Classify the following polynomials based...

Classify the following polynomials based on number of terms
`u^(23) -u^(4)`

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The correct Answer is:
binomials as they contain only two terms.
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SURA PUBLICATION-ALGEBRA-EXERCISE 3.1(Additional Questions and Answers)
  1. Classify the following polynomials based on number of terms y^(4) + ...

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  2. Classify the following polynomials based on number of terms y^(20) +...

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  3. Classify the following polynomials based on number of terms 6

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  4. Classify the following polynomials based on number of terms 2u^(3) +...

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  5. Classify the following polynomials based on number of terms u^(23) -...

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  6. Classify the following polynomials based on number of terms y

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  7. Classify the following polynomials based on their degree. p(x) = 3

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  8. Classify the following polynomials based on their degree. p(y) = (5...

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  9. Classify the following polynomials based on their degree. p(x) = 2x^...

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  10. Classify the following polynomials based on their degree. p(x) = 3x^...

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  11. Classify the following polynomials based on their degree. p(x) = x +...

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  12. Classify the following polynomials based on their degree. p(x) = - ...

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  13. Classify the following polynomials based on their degree. p(x) = x^(...

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  14. Classify the following polynomials based on their degree. p (x) = 5...

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  15. Classify the following polynomials based on their degree. p(x) =4x

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  16. Classify the following polynomials based on their degree. p(x) = ( 3...

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  17. Classify the following polynomials based on their degree. p(x) = sqr...

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  18. Classify the following polynomials based on their degree. p(y) = y^(...

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  19. Find the product of given polynomials p(x) = 3x^(3) +2x - x^(2) + 8 a...

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  20. Let P(x) = 4x^(2) - 3x + 2x^(3) + 5 and q(x) = x^(2) + 2x + 4 find p ...

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