Assertion :Bragg's equation has no solution, if `n = 2 and lambda gt d`
Reason : Bragg's equation is `n lambda = 2d sin theta`

Bragg s equation will have bno solution if :

Which of the following is incorrect statement about the Bragg's equation n lambda = 2d sin theta ?

The solution of Bragg's equation is possible if :

The solution of Bragg's equation will not exist if

If the equation 2 cos x + cos 2 lambda x=3 has only one solution , then lambda is

Let the number of solutions of the equations sinx =x^(2) - 4x +5 be lambda . The general solution of the equation 1+tan((lambda^(2) - 2lambda + 1)theta) + 2/(1-tan((lambda^(2) + 2lambda+1)theta)=0 is

If sin2x cos2x cos4x=lambda has a solution then lambda lies in the interval

In Bragg's equation for diffraction of X-rays 'n' represents

Bragg reflection can occur only when gamma le 2d .