Math, asked by rakhichandel1991, 5 months ago

sum of adjacent of a parallelogram is

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Answered by bhukyagopal123

Answer:

Sum of adjacent of a parallelogram is 180 degrees.

Answered by Anonymous

$\Large\boxed{\textsf{\textbf{\purple{$\mapsto$Parallelogram:}}}}$

A quadrilateral is said to be parallelogram if / Properties of parallelogram :-

Two pair of opposite sides are parallel.
Opposite sides are equal.
Opposite angles are equal.
Sum of adjacent angles is 180° .
Diagonals bisect each other.
Diagonals divide quadrilateral in two pairs of congruent triangles .

$\underline{\red{\sf \dashrightarrow Some\: more\:types\:of\: quadrilateral:-}}$

$\blue{\tt \leadsto Square:-}$

All angles are 90° .
All sides are equal.
Diagonals are equal.
Diagonals bisect each other.
Opposite sides are parallel.

$\setlength{\unitlength}{1 cm}\begin{picture}(12,8)\put(0.2,0){\line(0,1){0.2}}\put(0.2,0.2){\line(-1,0){0.2}}\put(3.8,0){\line(0,1){0.2}}\put(3.8,0.2){\line(1,0){0.2}}\put(3.8,4){\line(0,-1){0.2}}\put(3.8,3.8){\line(1,0){0.2}}\put(0.2,4){\line(0,-1){0.2}}\put(0.2,3.8){\line(-1,0){0.2}}\put(0,0){\line(1,0){4}}\put(4,0){\line(0,1){4}}\put(4,4){\line(-1,0){4}}\put(0,4){\line(0,-1){4}}\put(0,-0.3){$\sf A$}\put(4,-0.3){$\sf B$}\put(4,4.3){$\sf C$}\put(0,4.3){$\sf D $}\put(1.3,2){$\large \bf Square$}\end{picture}$

$\rule{200}2$

$\blue{\tt \leadsto Rhombus:-}$

A parallelogram is said to be rhombus if all sides are equal .

Opposite angles are equal.
All sides are equal .
Opposite sides are parallel.
Diagonals Intersect at 90° .
Diagonals bisect each other.

$\setlength{\unitlength}{1 cm}\begin{picture}(12,8)\put(0,0){\line(1,0){4}}\put(4,0){\line(1,2){2}}\put(6,4){\line(-1,0){4}}\put(2,4){\line(-1,-2){2}}\put(0,-0.3){$\sf A$}\put(4,-0.3){$\sf B$}\put(6,4.3){$\sf C$}\put(2,4.3){$\sf D $}\put(2,2){$\large \bf Rhombus$}\end{picture}$

$\rule{200}2$

$\blue{\tt \leadsto Rectangle:-}$

Opposite sides are equal.
All angles are 90° .
Opposite sides are parallel.
Diagonals are equal.

$\setlength{\unitlength}{1 cm}\begin{picture}(12,8)\put(0.2,0){\line(0,1){0.2}}\put(0.2,0.2){\line(-1,0){0.2}}\put(5.8,0){\line(0,1){0.2}}\put(5.8,0.2){\line(1,0){0.2}}\put(5.8,4){\line(0,-1){0.2}}\put(5.8,3.8){\line(1,0){0.2}}\put(0.2,4){\line(0,-1){0.2}}\put(0.2,3.8){\line(-1,0){0.2}}\put(0,0){\line(1,0){6}}\put(6,0){\line(0,1){4}}\put(6,4){\line(-1,0){6}}\put(0,4){\line(0,-1){4}}\put(0,-0.3){$\sf A$}\put(6,-0.3){$\sf B$}\put(6,4.3){$\sf C$}\put(0,4.3){$\sf D $}\put(2,2){$\large \bf Rectangle$}\end{picture}$

$\rule{200}2$

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