Download App

Transformation Formulae — MATHS STD 11 Science — Question

Gujarat BoardEnglish MediumSTD 11 ScienceMATHSTransformation Formulae4 Marks
Question
Prove that: $\frac{\sin3\text{A}+\sin5\text{A}+\sin7\text{A}+\sin9\text{A}}{\cos3\text{A}+\cos5\text{A}+\cos7\text{A}\cos9\text{A}}=\tan6\text{A}$

Answer

We have, $\text{LHS}=\frac{\sin3\text{A}+\sin5\text{A}+\sin7\text{A}+\sin9\text{A}}{\cos3\text{A}+\cos5\text{A}+\cos7\text{A}+\cos9\text{A}}$ $=\ \frac{(\sin9\text{A}+\sin3\text{A})+(\sin7\text{A}+\sin5\text{A})}{(\cos9\text{A}+\cos3\text{A})+(\cos7\text{A}+\cos5\text{A})}$ $=\ \frac{2\sin\Big(\frac{9\text{A}+3\text{A}}{2}\Big)\cos\Big(\frac{9\text{A}-3\text{A}}{2}\Big)+2\sin\Big(\frac{9\text{A}-3\text{A}}{2}\Big)\cos\Big(\frac{7\text{A}-5\text{A}}{2}\Big)}{2\cos\Big(\frac{9\text{A}+3\text{A}}{2}\Big)\cos\Big(\frac{9\text{A}-3\text{A}}{2}\Big)+2\cos\Big(\frac{7\text{A}+5\text{A}}{2}\Big)\cos\Big(\frac{7\text{A}-5\text{A}}{2}\Big)}$ $=\ \frac{2\sin6\text{A}\cos3\text{A}+2\sin6\text{A}\cos\text{A}}{2\cos6\text{A}\cos3\text{A}+2\cos6\text{A}\cos\text{A}}$ $=\ \frac{2\sin6\text{A}(\cos3\text{A}+\cos\text{A})}{2\cos6\text{A}(\cos3\text{A}+\cos\text{A})}$ $=\ \frac{\sin6\text{A}}{\cos6\text{A}}$ $=\ \tan6\text{A}$ $=\ \text{RHS}$ $\therefore\ \frac{\sin3\text{A}+\sin5\text{A}+\sin7\text{A}+\sin9\text{A}}{\cos3\text{A}+\cos5\text{A}+\cos7\text{A}\cos9\text{A}}=\tan6\text{A}$ Hence proved.

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

More "(Each question 4 marks)" from Transformation FormulaeTransformation Formulae — all question typesMATHS STD 11 Science question papersGujarat Board STD 11 Science question papersGujarat Board question paper generator

Similar questions

A die is thrown. Describe the following events:

  1. A: a number less than 7
  2. B: a number greater than 7
  3. C: a multiple of 3
  4. D: a number less than 4
  5. E: an even number greater than 4
  6. F: a number not less than 3

Also find ${A\cup B}$, ${A\cap B}$, ${B\cup C}$, ${E\cap F}$, ${D\cap E}$, A –C, D–E, ${E\cap F'}$, F'.

Differentiate the following from first principle$\sin\sqrt{2\text{x}}$
Find the equations to the diagonals of the rectangle the equations of whose sides are x = a, x = a', y = b and y = b'.
If then $\text{x}+\tan\Big(\frac{\pi}{3}\Big)+\tan\Big(\text{x}=\frac{2\pi}{3}\Big)=3,$prove that $\frac{3\tan\text{x}-\tan^3\text{x}}{1-3\tan^2\text{x}}=1$
Find the sum of the series whose $n^{th}$ term is: $2n^3 + 3n^2 - 1$
If $A(-2, 2, 3)$ and $B(13, -3, 13)$ are two points. Find the locus of a point P which moves in such a way that $3PA = 2PB$.
Find the locus of $P$ if $P A^2+P B^2=2 k^2$, where $A$ and $B$ are the points $(3,4,5)$ and $(-1,3,-7)$.
Prove the following identities $:\frac{(1+\cot\text{x}+\tan\text{x})(\sin\text{x}+\cos\text{x})}{\sec^3\text{x}-\text{cosec}^3\text{ x}}=\sin^2\text{x}\cos^2\text{x}$
Show that the set of all points such that the difference of their distances from (4, 0) and (-4, 0) is always equal to 2 represents a hyperbola
Show that the plane $a x+b y+c z+d=0$ divides the line joining the points $\left(x_1, y_1, z_1\right)$ and $\left(x_2, y_2, z_2\right)$ in the ratio $=\frac{\text{ax}_1+\text{by}_1+\text{cz}_1+d}{\text{ax}_2+\text{by}_2+\text{cz}_2+d}.$