Math, asked by kingsbakery5202, 7 months ago

the perimeter og a right _ angled triangle is 48 centimeters, and its area is 96 square centimeters. length of hypotenuse is 20 cm. ​

Answers

Answered by Anonymous
10

Step-by-step explanation:

Answer:

\setlength{\unitlength}{1.5cm}\begin{picture}(6,2)\linethickness{0.23mm}\put(7.7,2.9){\large\sf{A}}\put(7.7,1){\large\sf{B}}\put(10.6,1){\large\sf{C}}\put(8,1){\line(1,0){2.5}}\put(8,1){\line(0,2){1.9}}\qbezier(10.5,1)(10,1.4)(8,2.9)\put(9.4,1.9){\sf{\large{20 cm}}}\put(8.2,1){\line(0,1){0.2}}\put(8,1.2){\line(3,0){0.2}}\end{picture}

Perimeter = 48 cm

Area = 96 cm²

If the Triangle is Right Angle. It would must Follow Pythagorean Triplets.

\begin{tabular}{|c |c | c|}\cline{1-3}Perp/Base & Base/Perp & Hypotenuse \\\cline{1-3}3 & 4& 5 \\5 & 12 &13\\7 & 24&25 \\8 & 15&17\\\cline{1-3}\end{tabular}

So Either the Sides will any of these or Multiple of them. So by watching our Triangle Hypotenuse i.e. 20 cm we can find out that [ 3 , 4 , 5 ] pair will follow.

• Hypotenuse of Triangle is 4 times of the Pair (5 × 4) = 20 cm, Hence all sides will be 4 times too of the Pair.

• Perpendicular / Base = (3 × 4) = 12 cm

• Base / Perpendicular = (4 × 4) = 16 cm

Let's Check whether it's Correct or Not.

\rule{180}{1.5}

\underline{\bigstar\:\textsf{Perimeter of the Right Triangle :}}

:\implies\sf Perimeter=Perpendicular+Base+Hypotenuse\\\\\\:\implies\sf 48\:cm=12\:cm+16\:cm+20\:cm\\\\\\:\implies\sf 48\:cm=48\:cm

\underline{\bigstar\:\textsf{Area of the Right Triangle :}}

:\implies\sf Area=\dfrac{1}{2} \times Base \times Perpendicular\\\\\\:\implies\sf 96\:cm^2 = \dfrac{1}{2} \times16 \:cm \times 12 \:cm\\\\\\:\implies\sf 96\:cm^2 = 8 \:cm \times 12 \:cm\\\\\\:\implies\sf 96\:cm^2 = 96\:cm^2

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