the diagram shows the shape of the green of a miniature golf hole. what is the area of the green?

To answer this you will find the areas of the trapezoid and the parallelogram separately. You will add them together to get the total area of the green. You could put this all together as one equation too! The answer is 100 square feet. Please see the attached work.

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astha8579 astha8579 · Answer 2 · 2022-01-21T08:44:14+01:00

The area of green of golf course can be found by summing the area of pieces like that given rectangles and triangles.

The resultant area of the green of the golf course is given by:

100 sq. feet

Composing the area:

You have to calculate the area of those smaller pieces to find the total area of the green of the golf course.

Total area = sum of area of trapezoid and parallelogram.

The trapezoid in left of figure has height of 4 feet and parallel sides of 8 feet and 12 feet respectively.

Thus:

Area of trapezoid = [tex]\dfrac{1}{2}.\text{sum of parallel sides} \times height[/tex]

Area of trapezoid = [tex]\dfrac{1}{2}.4.(12+8) = 40 \: \rm feet^2[/tex]

The parallelogram on left has height 4 feet and base is of 15 feet.

Thus:

Area of parallelogram = [tex]\text{base} \times \text{height}[/tex] = [tex]4 \times 15 = 60 \: \rm feet^2[/tex]

Thus,

Total area = 40 + 60 = 100 sq. feet.

The resultant area of the green of the golf course is given by:

100 sq. feet

Learn more about trapezoid and parallelogram here:

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