11,375 views
26 votes
26 votes
Rectangle ABCD is shown on the grid.

A
(-1,4) 14
3
+2+
4
-6-5-4-312-3₁
(-3-b
B(3,3)
34
C(1-5)
X
What is the area of rectangle ABCD in square units?
O 3√17 square units
O 6√17 square units
O
17 square units
O 34 square units

Rectangle ABCD is shown on the grid. A (-1,4) 14 3 +2+ 4 -6-5-4-312-3₁ (-3-b B(3,3) 34 C-example-1
User Carl
by
2.8k points

1 Answer

23 votes
23 votes

well, we know it's a rectangle, so we know the opposite sides are perpendicular, so if we just get say the sides AD as its length and BA as its width, that'd give us its area, since it'll just be AD * BA.


~\hfill \stackrel{\textit{\large distance between 2 points}}{d = √(( x_2- x_1)^2 + ( y_2- y_1)^2)}~\hfill~ \\\\[-0.35em] ~\dotfill\\\\ A(\stackrel{x_1}{-1}~,~\stackrel{y_1}{4})\qquad D(\stackrel{x_2}{-3}~,~\stackrel{y_2}{-4}) ~\hfill AD=√((~~ -3- (-1)~~)^2 + (~~ -4- 4~~)^2) \\\\\\ ~\hfill AD=√(( -2)^2 + ( -8)^2)\implies \boxed{AD=√(68)} \\\\\\ B(\stackrel{x_1}{3}~,~\stackrel{y_1}{3})\qquad A(\stackrel{x_2}{-1}~,~\stackrel{y_2}{4}) ~\hfill BA=√((~~ -1- 3~~)^2 + (~~ 4- 3~~)^2)


~\hfill BA=√(( -4)^2 + (1)^2) \implies \boxed{BA=3} \\\\[-0.35em] ~\dotfill\\\\ \stackrel{\textit{\LARGE Area}}{(√(68))(3)\implies (√(2^2\cdot 17))(3)}\implies (2√(17))( 3)\implies \LARGE \begin{array}{llll} 6√(17) \end{array}

User ManishSingh
by
2.9k points
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