SOLUTION: Five lines parallel to the base of a triangle divide the other sides of the triangle each into 6 equal segments and the area into 6 distinct parts. If the area of the largest of th
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Question 833510: Five lines parallel to the base of a triangle divide the other sides of the triangle each into 6 equal segments and the area into 6 distinct parts. If the area of the largest of these parts is 66 cm squared then the area of the original triangle is:
I have drawn this out and played around with the lines but I do not see how I can find the area of any of the 6 sections Answer by KMST(5328) (Show Source):
You can put this solution on YOUR website! Each section plus everything above that section base is a triangle.
They are all similar triangles with the side lengths in the proportion .
The length of base and height are also in the same proportion, of course.
So, the areas are in the proportion
The area of the triangle made up of the top two sections is times the area of the smallest (top) triangle.
The area of the triangle made up of the top three sections is times the area of the smallest (top) triangle.
The area of the triangle made up of the top four sections is times the area of the smallest (top) triangle.
The area of the triangle made up of the top five sections is times the area of the smallest (top) triangle.
The original triangle's area is times the area of the smallest (top) triangle.
Let's call the area of the smallest (top) triangle square centimeters.
The area of the triangle made up of the top five sections is square centimeters.
The original triangle's area is square centimeters.
The difference, , is the area, in square centimeters of the bottom section.
Our equation is --> --> .
The area of the original triangle is square centimeters.
A picture is worth a thousand words: I added green lines to split the whole thing into triangles that are congruent with (the same as) the smallest (top) triangle.
Do you see hoe there are small triangles in all and of them in the bottom section?
