यदि (h(x)=\(x^5+x^2\)2-x^{10}-2x-7), तो (h(x)) की डिग्री क्या है?

If (h(x)=\(x^5+x^2\)2-x^{10}-2x-7), what is the degree of (h(x))?

Author: Muft Shiksha Editorial Team Published:
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Correct Answer

C. (4)

Step 1

Concept

(\(x^5+x^2\)2=x^{10}+2x-7+x-4). After subtraction, \(x^4\) remains, whose degree is (4).

Step 2

Why this answer is correct

The correct answer is C. (4). (\(x^5+x^2\)2=x^{10}+2x-7+x-4). After subtraction, \(x^4\) remains, whose degree is (4).

Step 3

Exam Tip

(\(x^5+x^2\)2=x^{10}+2x-7+x-4) है। घटाने पर \(x^4\) बचता है जिसकी डिग्री (4) है।

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Mathematics Answer, Explanation and Revision Hints

यदि (h(x)=\(x^5+x^2\)2-x^{10}-2x-7), तो (h(x)) की डिग्री क्या है? / If (h(x)=\(x^5+x^2\)2-x^{10}-2x-7), what is the degree of (h(x))?

Correct Answer: C. (4). Explanation: (\(x^5+x^2\)2=x^{10}+2x-7+x-4) है। घटाने पर \(x^4\) बचता है जिसकी डिग्री (4) है। / (\(x^5+x^2\)2=x^{10}+2x-7+x-4). After subtraction, \(x^4\) remains, whose degree is (4).

Which concept should I revise for this Mathematics MCQ?

(\(x^5+x^2\)2=x^{10}+2x-7+x-4). After subtraction, \(x^4\) remains, whose degree is (4).

What exam hint can help solve this Mathematics question?

(\(x^5+x^2\)2=x^{10}+2x-7+x-4) है। घटाने पर \(x^4\) बचता है जिसकी डिग्री (4) है।