on the set of axes below, the vertices of triangle PQR have coordinates P (-6,7) Q (2,1) and R (-1,-3) what is the area of triangle PQR?

Question

contestada

Respuesta :

grujan50 grujan50 · Answer 1 · 2019-01-25T01:24:52+01:00

Answer:

Area of ΔPQR = 25 units

Step-by-step explanation:

We will use the following formula to calculate the area of triangle ΔPQR:

A = 1/2 | x₁(y₂-y₃) + x₂(y₃-y₁) + x₃(y₁-y₂) | = 1/2 |(-6(1+3) +2(-3-7) +(-1)((7-1)| =

A = 1/2 |-6 · 4 + 2 · (-10) + (-1) · 6| = 1/2 | -24-20-6| = 1/2 | -50| = 1/2 · 50 = 25

A = 25 units

God with you!!!

Answer Link

varshamittal029 varshamittal029 · Answer 2 · 2022-06-04T05:52:57+02:00

Area of the triangle ΔPQR 25 square unit.

The area of the triangle is determined by half of the product of base and height of the triangle.

in coordinate system,

if (x₁,y₁ ),(x₂,y2₂), and (x₃ ,y₃) are the coordinates of three vertices of triangle.

area of the triangle = A = (1/2) |x₁(y₂ − y₃ ) + x₂(y3₃ − y₁) + x₃(y₁− y₂)|

According to asked question,

x₁=-6,y₁=7

x₂=2,y₂=1

x₃=-1,y₃=-3

using the above staed formula for area of triangle

A = (1/2) |x₁(y₂ − y₃ ) + x₂(y3₃ − y₁) + x₃(y₁− y₂)|

=1/2*|-6(1-(-3)) + 2 (-3-7) + (-1)(7-1)|

=1/2*|(-6*4 )+(2*(-10)) + ((-1)*6)|

= 1/2*| -24-20-6|

= 1/2*| -50|

= 1/2*50

= 25 square unit

Therefore Area of the triangle ΔPQR 25 square unit

learn more about area of a triangle

here: https://brainly.com/question/18366383

#SPJ2