Question

In Fig. 6.40, 2X = 62°, _ XYZ = 54°. If YO and ZO are the bisectors of ZXYZ and ZXZY respectively of A XYZ, find Z OZY and Z YOZ.​

Answer 1

In triangle XYZ,

Angle X = 62°

Angle XYZ = 54°

Angle X + angle XYZ + angle Z = 180° [by angle addition property of triangle]

62° + 54° + angle z = 180°

116°+angle z = 180°

Angle z = 180-116

Angle z = 64°

OZ is angle bisector of angle XYZ

Angle OZY = 32° •••••••••• (1) eq

Similarly Oz is the angle bisector of angle XYZ

Angle OYZ = 27°••••••••••(2) eq

In triangle oyz,

Angle OYZ + OZY + YOZ = 180°[ by angle sum property of triangle]

27°+32°+ angle YOZ = 180°

59°+angle YOZ=180°

Angle YOZ = 180°+59°

Angle YOZ = 121°

Therefore, angle ozy =32° and angle YOZ = 121°

Answer 2

${\tt{Question}}\: \purple☟$

In Fig. 6.40, 2X = 62°, _ XYZ = 54°. If YO and ZO are the bisectors of ZXYZ and ZXZY respectively of A XYZ, find Z OZY and Z YOZ.

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$\red&#9998{\tt{Answer}}\: \orange☟$

⠀⠀$&#9679\purple{\bf{See \:the \:attachment}}\red{⇑}$

⠀ $&#9679\orange{\bf{Question\: solved}}\: \green✔$

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All necessary formulas⤵️

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$\purple{\boxed{\bf{Angle\:sum\: property}}}$

Angle sum property of triangle states that the sum of interior angles of a triangle is 180°. Proof .Thus, the sum of the interior angles of a triangle is 180°.

$\blue{\tt{Example:-}}$

$\red{\boxed{a+b+c=180°}}$

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$\orange{\boxed{\bf{Alternate\: interior\:angle}}}$

Alternate interior angles are angles formed when two parallel or non-parallel lines are intersected by a transversal.Alternate interior angles are equal if the lines intersected by the transversal are parallel.

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$\orange\star{\bf{\red{\underbrace{complementary \:angle}}}}\red\star$

The sum of 2 numbers$=90°$

example $a−b=90°$

how to find "a" if a is not mentioned

$\red{\underbrace{\bf{\orange{Given࿐}}}}$

$a= \: ?$

$b = 40$

$a+40=\:90°$

$a=90-40°$

$a=50°$

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$\pink\star{\bf{\purple{\underbrace{supplementary\: angle}}}}\red\star$

The sum of two numbers$= \:180°$

example $a+b=180°$

how to find "a" if a is not mentioned

Given

$a= \:?$

$b =\: 40$

$a+40=180°$

$a=180-40°$

$a=140°$

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$\orange\star{\bf{\green{\underbrace{Adjacent \:angle}}}}\red\star$

If there is a common ray between ${\bf&#x2220}a$ and ${\bf&#x2220}b$ so it is a adjacent angle.

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$\orange\star{\bf{\blue{\underbrace{Vertical\: opposite\: angle }}}}\red\star$

Vertical angles are pair angles formed when two lines intersect. Vertical angles are sometimes referred to as vertically opposite angles because the angles are opposite to each other.

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$\orange\star{\bf{\orange{\underbrace{lenear\: pair \:of\: angles}}}}\red\star$

Here ${\bf&#x2220}a$$+{\bf&#x2220}b$$=$180°.

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