The similar figures, parallelograms ▱QUAD and ▱STOP, have a ratio of 3:1 between their corresponding sides. If ▱STOP has an area of 64 square yards, then ▱QUAD has an area of
a0 square yards.
The similar figures, parallelograms ▱QUAD and ▱STOP, have a ratio of 3:1 between their corresponding sides. If ▱QUAD has a perimeter of 210 centimeters, then ▱STOP has a perimeter of
a0 centimeters.
The similar figures, parallelograms ▱QUAD and ▱STOP, have a ratio of 3:1 between their corresponding sides. If = 10, then =
a0.
The similar figures, parallelograms ▱QUAD and ▱STOP, have a ratio of 3:1 between their corresponding sides. If = 15, then =
a0.
Which of the following options best represent the equation of a function?
Select all that apply.
x + y = 16
x2 + y2 = 16
y = 2
x = 2
y = x2 + 2
y = |x + 2|
you keep saying "If = 10"
which is meaningless. Do you not read what you post?
for the function thing, y is a function of x if each x relates to a single y.
Draw the graphs if in doubt, and use the vertical-line test.
To find the area of ▱QUAD, we can use the ratio between their corresponding sides. Since the ratio is 3:1, the ratio of their areas will be the square of the corresponding sides.
Let x be the length of one side of ▱QUAD. Then, the length of the corresponding side of ▱STOP will be x/3.
The area of ▱STOP is given as 64 square yards. Since the area of a parallelogram is equal to the base multiplied by the height, we can set up the following equation:
(x/3)(h) = 64
To find the height, we need to know the value of x. Unfortunately, it is not provided in the given information.
Similarly, to find the perimeter of ▱STOP, we can use the same ratio between their corresponding sides. Let x be the length of one side of ▱QUAD. Then, the length of the corresponding side of ▱STOP will be x/3.
The perimeter of ▱QUAD is given as 210 centimeters. Since the perimeter of a parallelogram is equal to the sum of all its sides, we have:
2(x + y) = 210
Here, y represents the other side of ▱QUAD. Again, we do not have enough information to solve for the length of x or y.
Finally, if the ratio = 10, we can use the same ratio to find the value of in terms of . Let's say represents the length of one side of ▱QUAD. Then, the length of the corresponding side of ▱STOP will be /3.
Therefore, the length of the corresponding side of ▱STOP is 10/3.