Three phases of taxonomy, alpha, beta and omega were recognised by

vec u , vec v and vec w are three non-coplanar unit vecrtors and alpha,beta and gamma are the angles between vec u and vec v , vec v and vec w ,a n d vec w and vec u , respectively, and vec x , vec y and vec z are unit vectors along the bisectors of the angles alpha,betaa n dgamma , respectively. Prove that [ vecx xx vec y vec yxx vec z vec zxx vec x]=1/(16)[ vec u vec v vec w]^2sec^2(alpha/2)sec^2(beta/2)sec^2(gamma/2) .

If sin alpha = sin beta and cos alpha = cos beta then-

If tan alpha = 7/5, tan beta=5/7 " then find the values of " tan (alpha + beta) " and " cot (alpha - beta)

Sorrie 4236 species of animals were recognised by Linnaeus in his book

Let f(x)=ax^3+bx^2+cx+1 has exterma at x=alpha,beta such that alpha beta (a)three equal real roots (b)one negative root if f(alpha) > 0 and f(beta) (c)one positive root if f(alpha) 0 (d) none of these

If alpha , beta , gamma in {1,omega,omega^(2)} (where omega and omega^(2) are imaginery cube roots of unity), then number of triplets (alpha,beta,gamma) such that |(a alpha+b beta+c gamma)/(a beta+b gamma+c alpha)|=1 is

If p lt 0 and alpha, beta, gamma are cube roots of p then for any a,b and c show that (aalpha+b beta + cgamma)/(a beta+bgamma +calpha)=omega^(2) where omega is an imaginary cube root of 1.

If alpha, beta are the roots of x^(2) - px + q = 0 and alpha', beta' are the roots of x^(2) - p' x + q' = 0 , then the value of (alpha - alpha')^(2) + (beta -alpha')^(2) + (alpha - beta')^(2) + (beta - beta')^(2) is

If omega be a complex cube root of unity and x=alpha+beta,y=alpha+beta omega, z=alpha + beta omega^(2), show that, x^(3)+y^(3)+z^(3)=3(alpha^(3)+beta^(3)).