मराठी

Show that any number of the form 4^n, n ∈ N can never end with the digit 0.

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प्रश्न

Show that any number of the form 4n, n ∈ N can never end with the digit 0.

संख्यात्मक
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उत्तर

Given: Let the number be 4n, where n ∈ N. We want to show 4n cannot end with the digit 0.

Step-wise calculation:

1. If an integer ends with digit 0, it is divisible by 10, so it must have both prime factors 2 and 5.

2. 4n = (22)n = 22n, so the prime factorization of 4n contains only the prime 2 (no factor 5).

3. By uniqueness of prime factorization, 4n cannot have 5 as a factor, hence it cannot be divisible by 10.

Therefore, no number of the form 4n (n ∈ N) can end with the digit 0.

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पाठ 1: Real Numbers - TEST YOURSELF [पृष्ठ ४४]

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आर. एस. अग्रवाल Mathematics [English] Class 10
पाठ 1 Real Numbers
TEST YOURSELF | Q 5. | पृष्ठ ४४
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