Let `log_(a)N=alpha + beta` where ` alpha ` is integer and ` beta =[0,1)`. Then , On the basis of above information , answer the following questions.
The difference of largest and smallest integral value of N satisfying ` alpha =3 and a =5` , is

If number of solution and sum of solution of the equation 3sin^(2)x-7sinx +2=0, x in [0,2pi] are respectively N and S and f_(n)(theta)=sin^(n)theta +cos^(n) theta . On the basis of above information , answer the following questions. If alpha is solution of equation 3sin^(2)x-7sinx+2=0, x in [0,2pi] , then the value of f_(4)(alpha) is

Let log_2N=a_1+b_1,log_3N=a_2+b_2 and log_5N=a_3+b_3 , where a_1,a_2,a_3notin1 and b_1,b_2 b_3 in [0,1) . If a_1=6,a_2=4 and a_3=3 ,the difference of largest and smallest integral values of N, is

The minimum value of the expression sinalpha+sin beta+sin gamma , where alpha, beta, gamma are real numbers satisfying alpha+beta+gamma=pi , is

Let alpha and beta be non-zero real numbers such that 2 ( cos beta - cos alpha) + cos alpha cos beta =1 . Then which of the following is/are true ?

If alpha and beta is the root of the equation x^2-3x+2=0 then find the value of alpha^2 + beta^2

If cos(alpha+beta)=(4)/(5) and sin(alpha-beta)=(5)/(13) , where alpha lie between 0 and (pi)/(4) , then find that value of tan2alpha .

If alpha and beta are the roots of 4x^2 + 3x + 7 = 0 then the value of alpha beta

f: D->R, f(x) = (x^2 +bx+c)/(x^2+b_1 x+c_1) where alpha,beta are the roots of the equation x^2+bx+c=0 and alpha_1,beta_1 are the roots of x^2+b_1 x+ c_1= 0 . Now answer the following questions for f(x). A combination of graphical and analytical approach may be helpful in solving these problems. (If alpha_1 and beta_1 are real, then f(x) has vertical asymptote at x = (alpha_1,beta_1) If alpha_1 lt alpha lt beta_1 lt beta , then

The sum of first 2n terms of an AP is alpha . and the sum of next n terms is beta, its common difference is

If tanalpha=m/(m+1)a n dtanbeta=1/(2m+1) . Find the possible values of (alpha+beta)