7. Find the area of a right triangle whose base is 1.2 m and hypotenuse 3.7 m. About the author Ximena
Answer: Area of a right triangle is 2.1 m². Step-by-step explanation: Given that: Base of a right triangle = 1.2 m Hypotenuse of a right triangle = 3.7 m To Find: Area of a right triangle. First finding the height of a right triangle: By pythagoras theorem. ⟶ H² = P² + B² ⟶ (3.7)² = P² + (1.2)² ⟶ 13.69 = P² + 1.44 ⟶ P² = 13.69 – 1.44 ⟶ P² = 12.25 ⟶ P = √12.25 ⟶ P = 3.5 ∴ Perpendicular/Height of a right triangle = 3.5 m Finding the area of a right triangle: ⇒ Area = (B × P)/2 ⇒ Area = (1.2 × 3.5)/2 ⇒ Area = 2.1 ∴ Area of a right triangle = 2.1 m² Some abbreviations used are: H = Hypotenuse P = Perpendicular/Height B = Base Reply
꧁༺Answer ༻꧂ we know that: Area of right angle triangle = 1/2 * Base * perpendicular height And According to Pythagoras theorem (Hypotenuse)² = (Base)² + (perpendicular)² Here, Base = 1.2 m Hypotenuse = 3.7 m => Perpendicular = √(H² – B²) = √ (3.7² – 1.2²) = √ (13.69 – 1.44) = √ 12.25 = 3.5 m Now, => Area = 1/2 * B * P = 1/2 * 1.2 * 3.5 = 1/2 * 4.2 = 2.1 m² Reply
Answer:
Step-by-step explanation:
Given that:
To Find:
First finding the height of a right triangle:
By pythagoras theorem.
⟶ H² = P² + B²
⟶ (3.7)² = P² + (1.2)²
⟶ 13.69 = P² + 1.44
⟶ P² = 13.69 – 1.44
⟶ P² = 12.25
⟶ P = √12.25
⟶ P = 3.5
∴ Perpendicular/Height of a right triangle = 3.5 m
Finding the area of a right triangle:
⇒ Area = (B × P)/2
⇒ Area = (1.2 × 3.5)/2
⇒ Area = 2.1
∴ Area of a right triangle = 2.1 m²
Some abbreviations used are:
꧁༺Answer ༻꧂
we know that:
Area of right angle triangle = 1/2 * Base * perpendicular height
And
According to Pythagoras theorem
(Hypotenuse)² = (Base)² + (perpendicular)²
Here,
Base = 1.2 m
Hypotenuse = 3.7 m
=> Perpendicular = √(H² – B²)
= √ (3.7² – 1.2²)
= √ (13.69 – 1.44)
= √ 12.25
= 3.5 m
Now,
=> Area = 1/2 * B * P
= 1/2 * 1.2 * 3.5
= 1/2 * 4.2
= 2.1 m²