Answer:
The area of parallelogram ABCD is equal to the area of parallelogram EFGH.
Step-by-step explanation:
Given
Parallelogram ABCD
Parallelogram EFGH
Required
Compare the areas of both parallelograms
The area of a parallelogram is:
So: To do this, we plot ABCD and EFGH on a grid, then we measure the base and the height of both.
See attachment 1 for ABCD
In (1), we have:
So, the area is:
See attachment 2 for EFGH
In (2), we have:
So, the area is:
<em>By comparison, they both have the same areas</em>
Answer:
Answer: 40 sq. in.
Step-by-step explanation:
First we gotta find the area of triangle part of the shape, we can see the left side of the shape is 5 in. , so we subtract the 3 from 5 which gives 2 the height of the triangle.
Now, we find the length for the base of the triangle, the top part of the shape is 7 in. , so we subtract 7 from 12 which gives us 5 in. as the base
Now, we find the area of the triangle:
A = 
b × h
A = ( × 5 in,) × 2 in
A = 5 sq. in.
Now we find the area for the rectangle:
A = b × h
A = 5 x 7
A = 35 sq. in
Finally, we add the areas together
35 sq. in. + 5 sq. in. = 40 sq. in.
We get our answer 40 sq. in,
Plug in m/4 into the equation:
Solve the parentheses in the equation:
Your equation should now look like this:
The answer is
D.
Answer:
2488
Step-by-step explanation:
11 x 12 = 132
132 + 245 = 377
377 - 66= 311
311 x 8 = 2488
Answer:
Step-by-step explanation:
P(gold) = 
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