If A + B + C = , then ^2 A 2 + ^2 B 2 + ^2 C 2 is always - Vidyadip

MCQ

If $A + B + C = \pi ,$ then ${\tan ^2}\frac{A}{2} + {\tan ^2}\frac{B}{2} + $${\tan ^2}\frac{C}{2}$ is always

A
$ \le 1$
✓
$ \ge 1$
C
$= 0$
D
$= 1$

✓

Answer

Correct option: B.

$ \ge 1$

b
(b) $\tan \left( {\frac{A}{2} + \frac{B}{2} + \frac{C}{2}} \right) $

$= \frac{{{S_1} - {S_3}}}{{1 - {S_2}}} = \tan \frac{\pi }{2} = \infty $

$\therefore {S_2} = 1$ or $xy + yz + zx = 1$,

where $x = \tan \frac{A}{2}$etc.

Now ${(x - y)^2} + {(y - z)^2} + {(z - x)^2} \ge 0$

or $2\sum {x^2} - 2\sum xy \ge 0 \Rightarrow \sum {x^2} \ge 1$. $\{ \because \sum xy = 1\} $

Need a full question paper?

Generate a complete, print-ready paper with questions like this in minutes — across 16+ boards, with answer keys.

Start Generating Free

Explore more

JEE STD 11 Science question papers→Gujarat Board STD 11 Science question papers→Gujarat Board question paper generator→

Similar questions

If ${(1 + x)^n} = {C_0} + {C_1}x + {C_2}{x^2} + ..... + {C_n}{x^n},$ then the value of ${C_0} - {C_2} + {C_4} - {C_6} + .....$is

The equation to the chord joining two points $(x_1, y_1)$ and $(x_2, y_2)$ on the rectangular hyperbola $xy = c^2$ is

The region of Argand plane defined by $|z - 1|\,\, + \,\,|z + 1|\,\, \le 4$ is

Tangents are drawn to a unit circle with centre at the origin from each point on the line $2x + y = 4$. Then the equation to the locus of the middle point of the chord of contact is

In the polynomial $(x - 1)(x - 2)(x - 3).............(x - 100),$ the coefficient of ${x^{99}}$ is

The function $f(x) =$ ${x^{\frac{1}{{\ln \,x}}}}$

If ${N_a} = \{ an:n \in N\} ,$ then ${N_3} \cap {N_4} = $

If ${\Delta _1} = \left| {\begin{array}{*{20}{c}}
x&{\sin \,\theta }&{\cos \,\theta } \\
{\sin \,\theta }&{ - x}&1 \\
{\cos \,\theta }&1&x
\end{array}} \right|$ and ${\Delta _1} = \left| {\begin{array}{*{20}{c}}
x&{\sin \,2\theta }&{\cos \,\,2\theta } \\
{\sin \,2\theta }&{ - x}&1 \\
{\cos \,\,2\theta }&1&x
\end{array}} \right|$, $x \ne 0$ ; then for all $\theta \in \left( {0,\frac{\pi }{2}} \right)$

$\int_{}^{} {2\sin x} \cos x\;dx$ is equal to

The number of solid cones with integer radius and integer height each having its volume numerically equal to its total surface area is