Prove that the square of any positive integer is of the form 4q or 4q + 1 for some integer q.

The correct option is (a) 9. N is least positive integer and when a digit c is written after last digit of N, the resulting number is divisible by c. ⇒  So, (N)c / c​ Least positive integer (N) which is divisible...

A) (i) and (iii)

Correct option is  C) (6, 8, 10)

Correct option is (D) 15 6000 \(=100\times4\times3\times5=10^2\times2^2\times3\times5.\) Since, factors 10 & 2 are in square but 3 & 5 are in not square. \(\therefore\) We have to multiply 6000 by 15 to get a perfect...

(B) 0 1 + (i2)n + (i4)n + (i2)3n = 1 – 1 + 1 – 1 …..(n odd positive integer) = 0

Let the integer be ‘a’.  Given, an integer is added to its square, the sum is 90  ⇒ a + a2 = 90  ⇒ a2 + 10a – 9a – 90 = 0  ⇒...

(c) Both A and R are correct and R is correct explanation of A.

Correct Answer - a Both assertion and reason are true and the reason is the correct explanation of the assertion

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