If `alpha` and `beta` are two different solutions lying between `-pi/2`and `pi/2` of the equation `2Tan theta+ Sec theta = 2` then `Tan alpha+ Tan beta` is

If alpha and beta are two different solutions lying between -(pi)/(2) and (pi)/(2) of the equation 2tan theta+sectheta=2 then tanalpha+tanbeta =

If alpha, beta are solutions of a tan theta + b sec theta = c then tan (alpha + beta)=

If alpha, beta are the solutions of a cos 2theta + b sin 2theta = c , then tan alpha tan beta=

If alpha and beta are the solutions of the equation a tan theta+b sec theta=c then (alpha+beta)=

If alpha, beta be the solutions of theta for the equation a tan theta + b sec theta = c then prove that tan(alpha+ beta) = 2ac/(a^(2)-c^(2)) .

If alpha, beta are two values lying between 0 and 2pi for which tan theta = k then the value of frac{tan alpha}{2} *frac{tan beta}{2} is....

If alpha + beta and alpha - beta are solutions of theta for the equation tan^(2)theta - 4tan theta =-1 where 0 lt alpha lt pi/2 and 0 lt beta lt pi/2 then find alpha and beta .

If alpha and beta are the solutions of the equation a tan theta+b sec theta=c, then show that tan(alpha+beta)=(2ac)/(a^(2)-c^(2))