Question

Syed Amir Ali asked Apr 11, 2023

24,132 views

2 Answers

SQer · Answer 1 · 2023-04-14T10:37:06+0000

Answer:

The distance between the parallel sides is 20cm.

Explanation:

Area of a trapezoid:

A=(a+b)/(2)* h

where a and b are the 2 bases, and h is the height. The value we're trying to find here is the height.

3 of the 4 variables in this equation are already given:

A = 800

a = 48

b = 32

Just plug those in and solve for h:

$\rightarrow 800=(48+32)/(2)* h\\\rightarrow 800=(80)/(2)* h\\\rightarrow 800=40* h\\\rightarrow 800/40=h\\\rightarrow h=20$

Scott Crooks · Answer 2 · 2023-04-15T13:40:30+0000

Answer:

The distance between the parallel sides of trapezium is 20 cm.

Step-by-step explanation:

Here's the required formula to find the distance between the parallel sides of trapezium.

$\star\small{\underline{\boxed{\tt{\purple{A =(1)/(2) * \Big(Sum \: of \: parallel \: sides \Big)* h}}}}}$

Substituting all the given values in the formula to find the distance between the parallel sides of trapezium :

${\implies{\sf{A = (1)/(2) * \Big(Sum \: of \: parallel \: sides \Big)* h}}}$

${\implies{\sf{A = (1)/(2) * \Big( a + b\Big)* h}}}$

${\implies{\sf{800 = (1)/(2) * \Big(48 + 32\Big)* h}}}$

${\implies{\sf{800 = (1)/(2) * \Big( \: 80 \: \Big)* h}}}$

${\implies{\sf{800 = (1)/(2) * 80 * h}}}$

${\implies{\sf{800 = (80)/(2) * h}}}$

${\implies{\sf{h = 800 * (2)/(80)}}}$

${\implies{\sf{h = \cancel{800} * \frac{2}{\cancel{80}}}}}$

${\implies{\sf{h = 10 * 2}}}$

${\implies{\sf{h = 20 \: cm}}}$

$\star{\underline{\boxed{\sf{\red{Height = 20 \: cm}}}}}$

Hence, the height of trapezium is 20 cm.

$\rule{300}{2.5}$

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