QUESTION IMAGE
Question
find the perimeter and area of the polygon with the given vertices. round to the nearest hundredth, if necessary. j(-1,3),k(5,3),l(2,-2) the perimeter is about □ units. the area is □ square units.
Step1: Find the length of \(JK\)
The coordinates of \(J(-1, 3)\) and \(K(5, 3)\). Since the \(y\)-coordinates are the same, the distance \(JK\) is the difference in \(x\)-coordinates.
\(JK=\vert5 - (-1)\vert=\vert5 + 1\vert = 6\)
Step2: Find the length of \(KL\)
The coordinates of \(K(5, 3)\) and \(L(2, -2)\). Use the distance formula \(d=\sqrt{(x_2 - x_1)^2+(y_2 - y_1)^2}\)
\(KL=\sqrt{(2 - 5)^2+(-2 - 3)^2}=\sqrt{(-3)^2+(-5)^2}=\sqrt{9 + 25}=\sqrt{34}\approx5.83\)
Step3: Find the length of \(LJ\)
The coordinates of \(L(2, -2)\) and \(J(-1, 3)\). Use the distance formula.
\(LJ=\sqrt{(-1 - 2)^2+(3 - (-2))^2}=\sqrt{(-3)^2+(5)^2}=\sqrt{9 + 25}=\sqrt{34}\approx5.83\)
Step4: Calculate the perimeter
Perimeter \(=JK + KL+LJ=6+\sqrt{34}+\sqrt{34}=6 + 2\sqrt{34}\approx6+2\times5.83 = 6 + 11.66=17.66?\) Wait, no, wait, let's recalculate:
Wait, \(JK = 6\), \(KL=\sqrt{(2 - 5)^2+(-2 - 3)^2}=\sqrt{9 + 25}=\sqrt{34}\approx5.83095\)
\(LJ=\sqrt{(-1 - 2)^2+(3 - (-2))^2}=\sqrt{9 + 25}=\sqrt{34}\approx5.83095\)
So perimeter \(=6 + 5.83095+5.83095=6 + 11.6619\approx17.66?\) Wait, maybe I made a mistake. Wait, the polygon is a triangle with vertices \(J(-1,3)\), \(K(5,3)\), \(L(2,-2)\)
Wait, let's re - check the distance between \(J\) and \(L\):
\(x_1=-1,y_1 = 3\); \(x_2=2,y_2=-2\)
\(d=\sqrt{(2-(-1))^2+(-2 - 3)^2}=\sqrt{(3)^2+(-5)^2}=\sqrt{9 + 25}=\sqrt{34}\approx5.83\)
Distance between \(K\) and \(L\): \(x_1 = 5,y_1=3\); \(x_2=2,y_2=-2\)
\(d=\sqrt{(2 - 5)^2+(-2 - 3)^2}=\sqrt{(-3)^2+(-5)^2}=\sqrt{9 + 25}=\sqrt{34}\approx5.83\)
Distance between \(J\) and \(K\): \(x_1=-1,y_1 = 3\); \(x_2=5,y_2=3\)
\(d=\vert5-(-1)\vert=6\)
So perimeter \(=6 + 5.83+5.83=17.66\)? Wait, but maybe I miscalculated. Wait, \(\sqrt{34}\approx5.83095\), so \(2\sqrt{34}\approx11.6619\), \(6 + 11.6619=17.6619\approx17.66\)? But maybe the problem is a triangle, let's calculate the area.
Step5: Calculate the area of the triangle
We can use the formula for the area of a triangle with base \(b\) and height \(h\). The base \(JK = 6\) (since \(y\) - coordinates of \(J\) and \(K\) are the same, it's a horizontal line). The height is the vertical distance from \(L\) to the line \(JK\). The line \(JK\) is \(y = 3\), and the \(y\) - coordinate of \(L\) is \(-2\), so the height \(h=\vert3-(-2)\vert = 5\)
The area of a triangle is \(A=\frac{1}{2}\times b\times h\)
Here, \(b = JK=6\) and \(h = 5\)
So \(A=\frac{1}{2}\times6\times5 = 15\) square units.
Wait, for the perimeter, let's recalculate the sum:
\(JK = 6\), \(KL=\sqrt{34}\approx5.83\), \(LJ=\sqrt{34}\approx5.83\)
Perimeter \(=6 + 5.83+5.83=17.66\)? But maybe I made a mistake in the distance formula. Wait, no, the distance between \(J(-1,3)\) and \(L(2,-2)\):
\(\Delta x=2-(-1)=3\), \(\Delta y=-2 - 3=-5\)
So \(d=\sqrt{3^2+(-5)^2}=\sqrt{9 + 25}=\sqrt{34}\approx5.83\)
Distance between \(K(5,3)\) and \(L(2,-2)\):
\(\Delta x=2 - 5=-3\), \(\Delta y=-2 - 3=-5\)
\(d=\sqrt{(-3)^2+(-5)^2}=\sqrt{9 + 25}=\sqrt{34}\approx5.83\)
So perimeter \(=6+5.83 + 5.83=17.66\approx17.66\) (rounded to the nearest hundredth). But maybe the original problem has a different approach. Wait, perhaps I misread the vertices. Wait, the vertices are \(J(-1,3)\), \(K(5,3)\), \(L(2,-2)\). So it's a triangle.
Wait, let's recalculate the perimeter:
\(JK\): distance between \((-1,3)\) and \((5,3)\) is \(5-(-1)=6\)
\(KL\): distance between \((5,3)\) and \((2,-2)\): \(\sqrt{(2 - 5)^2+(-2 - 3)^2}=\sqrt{9 + 25}=\sqrt{34}\approx5.83\)
\(LJ\): distance between \((2,-2)\) and \((-1,3)\): \(\sqrt{(-1 - 2)^2+(3 - (-2))^2}=\sqrt{9 + 25}=\sqrt{34}\a…
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The perimeter is about \(18.81\) units.
The area is \(15\) square units.