In a quadrilateral ABCD, + is 2 times + If =140^ and =60^ then = - Vidyadip

MCQ

In a quadrilateral $\text{ABCD}, \angle\text{A}+\angle\text{C}$ is $2$ times $\angle\text{B}+\angle\text{D}$ If $\angle\text{A}=140^\circ$ and $\angle\text{D}=60^\circ$ then $\angle\text{B}=$

✓
$60^\circ$
B
$80^\circ$
C
$120^\circ$
D
None of these.

✓

Answer

Correct option: A.

$60^\circ$

$\angle\text{A}+\angle\text{B}+\angle\text{C}+\angle\text{D}=360^\circ\dots(1)$
Now, $\angle\text{A}+\angle\text{C}=2(\angle\text{B}+\angle\text{D}) \ ($given$) ...(2)$
Also, $\angle\text{A}=140^\circ,\ \angle\text{D}=60^\circ$
Putting value of $(\angle\text{A}+\angle\text{C})$ from eq. $(2)$ in eq. $(1)$
$2(\angle\text{B}+\angle\text{D})+\angle\text{B}+\angle\text{D}=360^\circ$
$3(\angle\text{B}+\angle\text{D})=360^\circ$
$\Rightarrow\angle\text{B}+\angle\text{D}=120^\circ$
$\Rightarrow\angle\text{B}+60^\circ=120^\circ$
$\Rightarrow\angle\text{B}=60^\circ$

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