यदि (3) रेडियन और \(x^\circ\) मिलकर एक सीधा कोण बनाते हैं, तो (x) का मान क्या होगा?
If (3) radians and \(x^\circ\) together form a straight angle, what is the value of (x)?
Explanation opens after your attempt
Correct Answer
A. (\frac{180\(\pi-3\)}{\pi})
Step 1
Concept
A straight angle is \(\pi\) radians, so the remaining angle is \(\pi-3\) radians. In degrees, it is (\frac{180\(\pi-3\)}{\pi}).
Step 2
Why this answer is correct
The correct answer is A. (\frac{180\(\pi-3\)}{\pi}). A straight angle is \(\pi\) radians, so the remaining angle is \(\pi-3\) radians. In degrees, it is (\frac{180\(\pi-3\)}{\pi}).
Step 3
Exam Tip
सीधा कोण \(\pi\) रेडियन होता है, इसलिए शेष कोण \(\pi-3\) रेडियन है। डिग्री में यह (\frac{180\(\pi-3\)}{\pi}) होगा।
Mathematics Answer, Explanation and Revision Hints
यदि (3) रेडियन और \(x^\circ\) मिलकर एक सीधा कोण बनाते हैं, तो (x) का मान क्या होगा? / If (3) radians and \(x^\circ\) together form a straight angle, what is the value of (x)?
Correct Answer: A. (\frac{180\(\pi-3\)}{\pi}). Explanation: सीधा कोण \(\pi\) रेडियन होता है, इसलिए शेष कोण \(\pi-3\) रेडियन है। डिग्री में यह (\frac{180\(\pi-3\)}{\pi}) होगा। / A straight angle is \(\pi\) radians, so the remaining angle is \(\pi-3\) radians. In degrees, it is (\frac{180\(\pi-3\)}{\pi}).
Which concept should I revise for this Mathematics MCQ?
A straight angle is \(\pi\) radians, so the remaining angle is \(\pi-3\) radians. In degrees, it is (\frac{180\(\pi-3\)}{\pi}).
What exam hint can help solve this Mathematics question?
सीधा कोण \(\pi\) रेडियन होता है, इसलिए शेष कोण \(\pi-3\) रेडियन है। डिग्री में यह (\frac{180\(\pi-3\)}{\pi}) होगा।
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