Let be a set of polynomials. Then the number of polynomials in , which are divisible by , is:
- A
- B
- C
- D
Let be a set of polynomials. Then the number of polynomials in , which are divisible by , is:
Correct answer:B
Standard Method
Given: .
Find: The number of polynomials in divisible by .
If a polynomial of degree is divisible by a polynomial of degree , then the quotient must be a linear polynomial.
Assume
where .
Now expand:
Comparing coefficients with , we get
Using the condition :
Each value of gives one distinct polynomial.
Therefore, the correct option is B.
Coefficient Comparison
Given: The polynomial is with and .
Find: How many such polynomials are divisible by .
For divisibility by , write the cubic as
because the quotient must be linear.
Expanding,
Now compare term by term with
So,
Since ,
Also , hence
This gives exactly valid choices.
Therefore, the number of such polynomials is , so the correct option is B.
Assuming an arbitrary quadratic or constant quotient is incorrect because a degree polynomial divided by a degree polynomial must give a linear quotient. Start with as the quotient.
Forgetting to compare coefficients term-by-term leads to missing the conditions , , and . After expansion, always match the coefficients of , , and the constant term.
Using only and ignoring is wrong. The actual restriction comes from , which gives and hence .
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