फलन (f(x)=\frac{x-2+1}{x-2-1}) का परिसर क्या है?

What is the range of (f(x)=\frac{x-2+1}{x-2-1})?

Explanation opens after your attempt
Correct Answer

A. ((-\infty,-1]\cup\(1,\infty\))

Step 1

Concept

If \(t=x^2\ge 0\) and \(t\ne 1\), then \(y=\frac{t+1}{t-1}\). Using \(t=\frac{y+1}{y-1}\ge 0\) gives the range ((-\infty,-1]\cup\(1,\infty\)).

Step 2

Why this answer is correct

The correct answer is A. ((-\infty,-1]\cup\(1,\infty\)). If \(t=x^2\ge 0\) and \(t\ne 1\), then \(y=\frac{t+1}{t-1}\). Using \(t=\frac{y+1}{y-1}\ge 0\) gives the range ((-\infty,-1]\cup\(1,\infty\)).

Step 3

Exam Tip

यदि \(t=x^2\ge 0\) और \(t\ne 1\), तो \(y=\frac{t+1}{t-1}\)। इससे \(t=\frac{y+1}{y-1}\ge 0\) देकर परिसर ((-\infty,-1]\cup\(1,\infty\)) मिलता है।

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Mathematics Answer, Explanation and Revision Hints

फलन (f(x)=\frac{x-2+1}{x-2-1}) का परिसर क्या है? / What is the range of (f(x)=\frac{x-2+1}{x-2-1})?

Correct Answer: A. ((-\infty,-1]\cup\(1,\infty\)). Explanation: यदि \(t=x^2\ge 0\) और \(t\ne 1\), तो \(y=\frac{t+1}{t-1}\)। इससे \(t=\frac{y+1}{y-1}\ge 0\) देकर परिसर ((-\infty,-1]\cup\(1,\infty\)) मिलता है। / If \(t=x^2\ge 0\) and \(t\ne 1\), then \(y=\frac{t+1}{t-1}\). Using \(t=\frac{y+1}{y-1}\ge 0\) gives the range ((-\infty,-1]\cup\(1,\infty\)).

Which concept should I revise for this Mathematics MCQ?

If \(t=x^2\ge 0\) and \(t\ne 1\), then \(y=\frac{t+1}{t-1}\). Using \(t=\frac{y+1}{y-1}\ge 0\) gives the range ((-\infty,-1]\cup\(1,\infty\)).

What exam hint can help solve this Mathematics question?

यदि \(t=x^2\ge 0\) और \(t\ne 1\), तो \(y=\frac{t+1}{t-1}\)। इससे \(t=\frac{y+1}{y-1}\ge 0\) देकर परिसर ((-\infty,-1]\cup\(1,\infty\)) मिलता है।