If n denotes a positive integer, h the Planck's constant, q the charge and B the magnetic field, then the quantity `((nh)/(2pi qB))` has the dimension of

If n denotes a positive integer h the Planck's constant q the charge and B the magnetic field then the quantity (nh)/(2 piqB) has the dimension of

The stopping potential for photoelectrons from a metal surface is V_(1) when monochromatic light of frequency v_(1) is incident on it. The stopping potential becomes V_(2) when monochromatic light of another frequency is incident on the same metal surface. If h be the Planck's constant and e be the charge of an electron, then the frequency of light in the second case is

If a > b and n is a positive integer, then prove that a^n-b^n > n(a b)^((n-1)//2)(a-b)dot

Let n be a fixed positive integer such that sin(pi/(2n))+cos(pi/(2n))=sqrtn/2 then

If n is positive integer and "cos" (pi)/(2n)+"sin" (pi)/(2n) =(sqrt(n))/(2) , then prove that 4 le n le 8

The dipole moment of a circular loop carrying a current I , is m and the magnetic field at the centre of the loops is B_(1) . When the dipole moment is doubled by keeping the current constant , the magnetic field at the the centre of the loop is B_(2) . The ratio (B_(1))/(B_(2)) is

denote the positive solution of the equation 3+3costheta=2sin^2thetadot The value of theta_3+theta_7 is 3 pi (b) 4 pi (c) 5 pi (d) 6 pi

If n be a positive integer and the sums of the odd terms ans even terms in the expansion of (a+x)^(n) be A and B repectively prove that , A^(2)-B^(2)=(a^(2)-x^(2))^(n)

Which of the following quantities has the same dimension as that of Planck's constant?