Find the values of w, x and y.

Question

asked Jun 15, 2021 233k views

1 Answer

Kishore Tamire · Answer 1 · 2021-06-21T08:51:11+0000

Answer:

w= 27.47 degree

x=9.99 cm

y=12.02 cm

Explanation:

The value of w:

In a right-angled triangle
$\tan \theta = \frac {\text{Perpendicular}}{\text{Base}}$

$\tan w = \frac {\text{Perpendicular}}{25+9}\;and \; \tan 63 = \frac {\text{Perpendicular}}{9}$

So,
$34 \tan w = 9\tan (63)$

$\tan w = (9/34)\tan(63)=0.52 \\\\w=\tan^(-1)(0.52) \\\\$

w= 27.47 degree

The value of x:

In a right-angled triangle
$\sin \theta = \frac {\text{Perpendicular}}{\text{Hypotaneous}}$

sin (27) =x/22

x= 22sin(27)

x=9.99 cm

The value of y:

By using Pythagoras theorem,

$y^2+y^2=17^2 \\\\2y^2 = 289 \\\\y^2 =289/2= 144.5 \\\\y=\sqrt {144.5} \\\\$

y=12.02 cm