Download App

Trigonometric Functions — MATHS STD 11 Science — Question

Rajasthan BoardEnglish MediumSTD 11 ScienceMATHSTrigonometric Functions5 Marks
Question
Prove the following identities:
$(\sec\text{x}\sec\text{x}+\tan\text{x}\tan\text{y})^2-(\sec\text{x}\tan\text{y}+\tan\text{x}\sec\text{y})^2=1$

Answer

$\text{L.H.S}=\big(\sec\text{x}\sec\text{x}+\tan\text{x}\tan\text{y}\big)^{2}-\big(\sec\text{x}\tan\text{y}+\tan\text{x}\sec\text{y}\big)^{2}$
$=\big(\sec\text{x}\sec\text{y}\big)^{2}+\big(\tan\text{x}\tan\text{y}\big)^{2}+2\sec\text{x}\sec\text{y}\tan\text{x}\tan\text{y}\\\ \ \ -\Big(\big(\sec\text{x}\tan\text{y}\big)^{2}+\big(\tan\text{x}\sec\text{y}\big)^{2}+2\sec\text{x}\tan\text{y}\tan\text{x}\sec\text{y}\Big)$ $\big[\text{using}\big(\text{a+b}\big)^{2}=\text{a}^{2}+\text{b}^{2}+2\text{ab}\big]$
$=\sec^{2}\text{x}\sec^{2}\text{y}+\tan^{2}\text{x}\tan^{2}\text{y}+2\sec\text{x}\sec\text{y}\tan{\text{x}}\tan{\text{y}}\\\ \ \ -\sec^{2}\text{x}\tan^{2}\text{y}-\tan^{2}\text{x}\sec^{2}\text{y}-2\sec\text{x}\sec\text{y}\tan\text{x}\tan\text{y}$ $\big[\text{using}\big(\text{ab}\big)^{2}=\text{a}^{2}\text{b}^{2}\big]$
$=\sec^{2}\text{x}\sec^{2}\text{y}-\sec^{2}\text{x}\tan^{2}\text{y}+\tan^{2}\text{x}\tan^{2}{\text{y}}-\tan^{2}\text{x}\sec^{2}\text{y}$
$=\sec^{2}\text{x}\big(\sec^{2}\text{y}-\tan^{2}\text{y}\big)+\tan^{2}\text{x}\big(\tan^{2}\text{y}-\sec^{2}\text{y}\big)$
$= \sec^{2}\text{x}1-\tan^{2}\text{x}1$ $\bigg[\because\sec^{2}\theta=1+\tan^{2}\theta\Rightarrow\sec^{2}\theta-\tan^{2}\theta=1\bigg]$
$=1+\tan^{2}\text{x}-\tan^{2}\text{x}$
$=1$
$=\text{R.H.S}$
$\text{Proved}$

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 "5 Marks Questions" from Trigonometric FunctionsTrigonometric Functions — all question typesMATHS STD 11 Science question papersRajasthan Board STD 11 Science question papersRajasthan Board question paper generator

Similar questions

If $\text{a},\ \text{b},\ \text{c}$ are in A.P., then show that:
$\text{bc}-\text{a}^2,\ \text{ca}-\text{b}^2,\ \text{ab}-\text{c}^2$ are in A.P.
Find the equation of the ellips whose focus is in the following case:

focus is (1, 2), directricx is 3x + 4y - 5 = 0 and $\text{e}=\frac{1}{2}.$

The 4th term of a G.P. is square of its second term, and the first firm is -3. Find its 7th term.
Evaluate the following limit:
$\lim\limits_{\text{h}\rightarrow0}\frac{\text{(a}+\text{h})^2\sin(\text{a}+\text{h})-\text{a}^2\sin\text{a}}{\text{h}}$
Find the equation to the ellipse in the following case:

Length of major axis 16 foci $(0, \pm6)$

Determine the number of 5 cards combinations out of a deck of 52 cards if at least one of the 5 cards has to be a king?
Find the derivative of x sinx from first principle.
Find the equation to the ellipse in the following case:
eccentricity $\text{e}=\frac{1}{2}$ and lenght of latus-rectum = 5
There are three shares of $A$ in a lottery in which there are $3$ prizes and 9 blanks. In another lottery, $B$ has 2 prizes and 6 blanks. Find the ratio of probabilities of winning of $A$ and $B$.
Out of 100 students; 15 passed in English, 12 passed in Mathematics, 8 in Science, 6 in English and Mathematics, 7 in Mathematics and Science; 4 in English and Science; 4 in all the three. Find how many passed.
  1. In English and Mathematics but not in Science.
  2. In Mathematics and Science but not in English.
  3. In Mathematics only.
  4. In more than one subject only.