Problem |
Hint |
3) The radius of all three semicircles is 1 unit. The height of the unshaded triangle is 3 units. What is the area of the shaded
trapezoidal portion of the figure?
|
- The width of the big triangle is _____ units
- The height of the big triangle is ______ units
- The larger and smaller triangles are similar so the width of the smaller triangle is the same as it's height which is _____ units.
- From here you can solve it by 2 different methods:
- Method 1: Area subtraction:
Shaded area = large triangle area - small triangle area =
______sq. units
- Method 2: Trapezoid formula:
Shaded area = (b1 + b2) h / 2 =
______ sq. units
|
4) The coordinates of three of the vertices of a rhombus located in the first quadrant are: (2,5), (4,7) and (1,8). What are the coordinates of the fourth point? Use the coordinate grid to the right.
|
- The given points are plotted on the graph.
- A rhombus can be made by creating a 4th point off point 3 by taking the offset of point 2 from point 1 and applying it to point 3: = ______
- A rhombus can be also made by creating a 4th point off point 1 by taking the offset of point 2 from point 3 and applying it to point 1: ______
- Draw the lines to make sure your construct is a rhombus. Either of these solutions is OK.
|
5) The figure shows a stained glass window design.
The white triangles are congruent and equilateral and have side length 5 inches. The two triangles in the shaded region are isosceles with side lengths shown, and the central region is a rectangle. What
is the area of the entire shaded region?
|
- The area of the rectangle is _______ sq. in.
- If you make a right triangle by cutting one of the isosceles triangles (vertically) in half, you should be able to find the height of those triangles using the pythagorean theorem and compute the isosceles triangle area = ______ inches.
- The total shaded area is ______________sq. in.
|