\(\sum_{r=0}^{n} {}^{n}C_r=2^n\) किस combinatorial idea से निकला है?

The identity \(\sum_{r=0}^{n} {}^{n}C_r=2^n\) is derived from which combinatorial idea?

Explanation opens after your attempt
Correct Answer

B. हर वस्तु को चुनना या न चुननाSelecting or not selecting each object

Step 1

Concept

The left side adds all selection sizes and the right side gives two choices for each object. In exams remember this identity through subset counting.

Step 2

Why this answer is correct

The correct answer is B. हर वस्तु को चुनना या न चुनना / Selecting or not selecting each object. The left side adds all selection sizes and the right side gives two choices for each object. In exams remember this identity through subset counting.

Step 3

Exam Tip

Left side all possible selection sizes को जोड़ता है और right side हर object के two choices देता है। परीक्षा में subset counting से यह identity याद रखें।

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Mathematics Answer, Explanation and Revision Hints

\(\sum_{r=0}^{n} {}^{n}C_r=2^n\) किस combinatorial idea से निकला है? / The identity \(\sum_{r=0}^{n} {}^{n}C_r=2^n\) is derived from which combinatorial idea?

Correct Answer: B. हर वस्तु को चुनना या न चुनना / Selecting or not selecting each object. Explanation: Left side all possible selection sizes को जोड़ता है और right side हर object के two choices देता है। परीक्षा में subset counting से यह identity याद रखें। / The left side adds all selection sizes and the right side gives two choices for each object. In exams remember this identity through subset counting.

Which concept should I revise for this Mathematics MCQ?

The left side adds all selection sizes and the right side gives two choices for each object. In exams remember this identity through subset counting.

What exam hint can help solve this Mathematics question?

Left side all possible selection sizes को जोड़ता है और right side हर object के two choices देता है। परीक्षा में subset counting से यह identity याद रखें।