If ` P_(1), P_(2), P_(3), ……, P_(m+1) ` are distinct prime numbers. Then the number of factors of `P_(1)^(n) P_(2)P_(3)...... P_(m+1)` is :

If P_1,P_2,......... P_(m+1) are distinct prime numbers. Then the number of factors of P_1^nP_2P_3....P_(m+1) is :

Let E_(1) and E_(2) be two independent events such that P(E_(1))=P_(1) and P(E_(2))=P_(2) , describe in words of the events whose probabilities are (i) P_(1)P_(2) (ii) (1-P_(1))P_(2) (iii) 1-(1-P_(1))(1-P_(2)) (iv) P_(1)+P_(2)-2P_(1)P_(2)

If P(n) be the statement " 10n+3 is a prime number", then prove that P(1) and P(2) are true but P(3) is false.

If p_(1),p_(2),p_(3) are altitudes of a triangle ABC from the vertices A,B,C and ! the area of the triangle, then p_(1).p_(2),p_(3) is equal to

Define a function phi:NtoN as follows phi(1)=1,phi(P^(n))=P^(n-1)(P-1) is prime and n epsilonN and phi(mn)=phi(m)phi(n) if m & n are relatively prime natural numbers. The number of natural numbers n such that phi(n) is odd is

A is a set containing n elements. A subset P_1 is chosen and A is reconstructed by replacing the elements of P_1 . The same process is repeated for subsets P_1,P_2,....,P_m with m>1 . The number of ways of choosing P_1,P_2,....,P_m so that P_1 cup P_2 cup....cup P_m=A is (a) (2^m-1)^(mn) (b) (2^n-1)^m (c) (m+n)C_m (d) none of these

P_(1), P_(2), P_(3) are altitudes of a triangle ABC from the vertices A, B, C and Delta is the area of the triangle, The value of P_(1)^(-1) + P_(2)^(-1) + P_(3)^(-1) is equal to-

Let the lengths of the altitudes from the vertices A(-1, 1), B(5, 2), C(3, -1) of DeltaABC are p_(1), p_(2), p_(3) units respectively then the value of (((1)/(p_(1)))^(2)+((1)/(p_(3)))^(2))/(((1)/(p_(2)))^(2)) is equal to

If p_(1),p_(2),p_(3) are the perpendiculars from the vertices of a triangle to the opposite sides, then prove that p_(1)p_(2)p_(3)=(a^(2)b^(2)c^(2))/(8R^(3))

The probability of ‘n’ independent events are P_(1) , P_(2) , P_(3) ……., P_(n) . Find an expression for probability that at least one of the events will happen.