90381 For some integer q, every odd integer is of the form:

90416 The sum of exponents of prime factors in the prime-factorisation of 196 is:

90417 If two positive integers tn and n arc expressible in the form m = pq\(^{3}\) and n = p\(^{3}\)q\(^{2}\), where p, q are prime numbers, then HCF (m, n) =

90420 If p\(_{1}\) and p\(_{2}\) are two odd prime numbers such that p\(_{1}\) > p\(_{2}\), then \(\text{p}^2_1-\text{p}^2_2\) is:

90422 A card is drawn at random from a pack of 52 cards. The probability that the card is drawn is neither an ace nor a king is:

90381 For some integer q, every odd integer is of the form:

90416 The sum of exponents of prime factors in the prime-factorisation of 196 is:

90417 If two positive integers tn and n arc expressible in the form m = pq\(^{3}\) and n = p\(^{3}\)q\(^{2}\), where p, q are prime numbers, then HCF (m, n) =

90420 If p\(_{1}\) and p\(_{2}\) are two odd prime numbers such that p\(_{1}\) > p\(_{2}\), then \(\text{p}^2_1-\text{p}^2_2\) is:

90422 A card is drawn at random from a pack of 52 cards. The probability that the card is drawn is neither an ace nor a king is:

90381 For some integer q, every odd integer is of the form:

90416 The sum of exponents of prime factors in the prime-factorisation of 196 is:

90417 If two positive integers tn and n arc expressible in the form m = pq\(^{3}\) and n = p\(^{3}\)q\(^{2}\), where p, q are prime numbers, then HCF (m, n) =

90420 If p\(_{1}\) and p\(_{2}\) are two odd prime numbers such that p\(_{1}\) > p\(_{2}\), then \(\text{p}^2_1-\text{p}^2_2\) is:

90422 A card is drawn at random from a pack of 52 cards. The probability that the card is drawn is neither an ace nor a king is:

90381 For some integer q, every odd integer is of the form:

90416 The sum of exponents of prime factors in the prime-factorisation of 196 is:

90417 If two positive integers tn and n arc expressible in the form m = pq\(^{3}\) and n = p\(^{3}\)q\(^{2}\), where p, q are prime numbers, then HCF (m, n) =

90420 If p\(_{1}\) and p\(_{2}\) are two odd prime numbers such that p\(_{1}\) > p\(_{2}\), then \(\text{p}^2_1-\text{p}^2_2\) is:

90422 A card is drawn at random from a pack of 52 cards. The probability that the card is drawn is neither an ace nor a king is:

90381 For some integer q, every odd integer is of the form:

90416 The sum of exponents of prime factors in the prime-factorisation of 196 is:

90417 If two positive integers tn and n arc expressible in the form m = pq\(^{3}\) and n = p\(^{3}\)q\(^{2}\), where p, q are prime numbers, then HCF (m, n) =

90420 If p\(_{1}\) and p\(_{2}\) are two odd prime numbers such that p\(_{1}\) > p\(_{2}\), then \(\text{p}^2_1-\text{p}^2_2\) is:

90422 A card is drawn at random from a pack of 52 cards. The probability that the card is drawn is neither an ace nor a king is: