If `b=3,c=4,a n dB=pi/3,` then find the number of triangles that can be constructed.

If A=30^0, a=7,a n db=8 in A B C , then find the number of triangles that can be constructed.

The sides BC, CA, AB of a triangle ABC have 3, 4 and 5 interior points respectively on them. The number of triangles that can be constructed using these points as vertices is

In triangle A B C , Medians A D and C E are drawn. If A D=5,/_D A C=pi/8,a n d/_A C E=pi/4 , then the area of the triangle A B C is equal to (25)/9 (b) (25)/3 (c) (25)/(18) (d) (10)/3

If an a triangle A B C , b=3ca n d C-B=90^0, then find the value of tanB

In a triangle ABC, (a)/(b) = (2)/(3) and sec^(2) A = (8)/(5) . Find the number of triangle satisfying these conditions

If characteristic of three numbers a, b and c and 5, -3 and 2, respectively, then find the maximum number of digits in N = abc.

In A B C ,C=60^0a n dB=45^0dot Line joining vertex A of triangle and its circumcenter (O) meets the side B CinD Find the ratio B D : D C Find the ratio A O : O D

If 0lt=xlt=2pia n d|cosx|lt=sinx , then then (a) set of all values of x is [pi/4,(3pi)/4] (b) the number of solutions that are integral nultiple of pi/4 is one (c) the number of the largest and the smallest solution is pi (d) the set of all values of x is x in [pi/4,pi/2]uu[pi/2,(3pi)/4]

The number of triangles that can be formed with 10 points as vertices n of them being collinear, is 110. Then n is a. 3 b. 4 c. 5 d. 6

Vertices of a variable acute angled triangle A B C lies on a fixed circle. Also, a ,b ,ca n dA ,B ,C are lengths of sides and angles of triangle A B C , respectively. If x_1, x_2a n dx_3 are distances of orthocenter from A ,Ba n dC , respectively, then the maximum value of ((dx_1)/(d a)+(dx_2)/(d b)+(dx_3)/(d c)) is -sqrt(3) b. -3sqrt(3) c. sqrt(3) d. 3sqrt(3)