Let \(S\) be the set of the first 11 natural numbers. Then the number of elements in
\[
A = \{ B \subseteq S : n(B) \ge 2 \text{ and the product of all elements of } B \text{ is even} \}
\]
is ____________.
Show Hint
Correct Answer: 1979
Solution and Explanation
Step 1: Define the set \(S\).
\[ S = \{1,2,3,4,5,6,7,8,9,10,11\} \] Even numbers in \(S\):
\[ \{2,4,6,8,10\} \Rightarrow 5 \text{ elements} \] Odd numbers in \(S\):
\[ 6 \text{ elements} \]
Step 2: Condition for product to be even.
A product is even if the subset contains at least one even number.
Step 3: Count all subsets with at least one even element.
Total subsets of \(S\):
\[ 2^{11} = 2048 \] Subsets containing only odd numbers:
\[ 2^{6} = 64 \] So, subsets with at least one even element:
\[ 2048 - 64 = 1984 \]
Step 4: Remove subsets with fewer than 2 elements.
Single-element even subsets:
\[ 5 \] Hence, required number of subsets:
\[ 1984 - 5 = 1979 \]
Final Answer:
\[ \boxed{1979} \]
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