ABC is an obtuse angled triangle whose `angle C =135^(@)`
Value of tanA + cotB is-

ABC is an obtuse angled triangle whose angle C =135^(@) Value of (cot A - 1)(cotB - 1) is

ABC is an obtuse angled triangle whose angle C =135^(@) Value of (1 + tan A)(1 + tanB) is-

If in an obtuse angled triangle the obtuse angle is (3pi)/4 and the other two angle are equal to two values of theta satisfying atantheta +bsectheta=c, when abs(b)lesqrt((a^2+c^2)), then a^2-c^2 is equal to

ABC is a right angle isosceles triangle with angleB=90^(@). If D is a point on AB so that angle CDB=15^(@) and if AD=35 cm then the value of CD is-

ABC is a right angled triangle whose /_B is right angle and BDbotAC , if AD=4cm and CD=16cm , then calculate the length of BD and AB .

ABC is an acute angled triangle in which cosec (B+C-A) =1 and cot (C+A-B)=1/sqrt(3) , then sin A =

If ABC is a right angled triangle, then the value of (cos ^(2)A +cos ^(2) B+ cos ^(2)C) is -

ABC is a right angled triangle, then the value of sin^(2)A + sin^(2)B + sin^(2)C will be-

ABC is a triangle where a=6, b=3 and cos(A-B)=4/5 Value of angle C is-