एक कंपनी में (5) विभाग और (6) कर्मचारी कोड हैं। यदि एक विभाग कोड और एक कर्मचारी कोड मिलाकर पहचान बनती है तो कुल पहचानें कितनी हैं?

A company has (5) department codes and (6) employee codes. If an identity is made by combining one department code and one employee code how many identities are possible?

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Correct Answer

A. (30) पहचानें(30) identities

Step 1

Concept

Department and employee code are independent parts. The total is \(5 \times 6=30\) identities.

Step 2

Why this answer is correct

The correct answer is A. (30) पहचानें / (30) identities. Department and employee code are independent parts. The total is \(5 \times 6=30\) identities.

Step 3

Exam Tip

विभाग और कर्मचारी कोड स्वतंत्र भाग हैं। कुल \(5 \times 6=30\) पहचानें बनेंगी।

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Mathematics Answer, Explanation and Revision Hints

एक कंपनी में (5) विभाग और (6) कर्मचारी कोड हैं। यदि एक विभाग कोड और एक कर्मचारी कोड मिलाकर पहचान बनती है तो कुल पहचानें कितनी हैं? / A company has (5) department codes and (6) employee codes. If an identity is made by combining one department code and one employee code how many identities are possible?

Correct Answer: A. (30) पहचानें / (30) identities. Explanation: विभाग और कर्मचारी कोड स्वतंत्र भाग हैं। कुल \(5 \times 6=30\) पहचानें बनेंगी। / Department and employee code are independent parts. The total is \(5 \times 6=30\) identities.

Which concept should I revise for this Mathematics MCQ?

Department and employee code are independent parts. The total is \(5 \times 6=30\) identities.

What exam hint can help solve this Mathematics question?

विभाग और कर्मचारी कोड स्वतंत्र भाग हैं। कुल \(5 \times 6=30\) पहचानें बनेंगी।