In a `DeltaABC, angleB=(pi)/(3) and angleC=(pi)/(4)` let D divide BC internally in the ratio `1:3`, then ` (sin(angleBAD))/(sin(angleCAD))` is equal to :

In a triagnle ABC, angle B=pi/3 " and " angle C = pi/4 let D divide BC internally in the ratio 1:3 .Then (sin (angle BAD))/((Sin (angle CAD)) is equal to

In triangle ABC,/_B=(pi)/(3), and /_C=(pi)/(4)* Let D divided BC internally in the ratio 1:3. Then (sin/_BAD)/(sin/_CAB) equals (a) (1)/(sqrt(6)) (b) (1)/(3)(c)(1)/(sqrt(3)) (d) sqrt((2)/(3))

In a Delta ABC,/_B=60^(@) and /_C=45^(@). Let D divides BC internally in the ratio 1:3. then value of (sin/_BAD)/(sin/_CAD) is (A) sqrt((2)/(3)) (B) (1)/(sqrt(3)) (C) (1)/(sqrt(6)) (D) (1)/(3)

In DeltaABC,a=2band|A-B|=(pi)/(3) , then angleC is equal to

In DeltaABC , angleA=(2pi^(c))/(3) and angleB=45^(@) . Find angleC in both the systems.

In a DeltaABC,angleC=(pi)/(3),"then "(3)/(a+b+c)-(1)/(a+c)=

If in DeltaABC,angleB=90^(@) and angleC=theta , then write the ratios sin theta and tan theta