Question
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Parallelogram upper R upper S upper T upper U is shown with base upper T upper U larger than height upper S upper T. Diagonals are drawn from upper R to upper T and upper S to upper U to meet at upper V.
In parallelogram RSTU
, RV
measures y+18
units and TV
measures 3y−10
units. How many units long is diagonal RT
?
(1 point)
Responses
16
16
14
14
64
64
32
32
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Parallelogram upper R upper S upper T upper U is shown with base upper T upper U larger than height upper S upper T. Diagonals are drawn from upper R to upper T and upper S to upper U to meet at upper V.
In parallelogram RSTU
, RV
measures y+18
units and TV
measures 3y−10
units. How many units long is diagonal RT
?
(1 point)
Responses
16
16
14
14
64
64
32
32
Skip to navigation
Answers
There are no human answers yet.
Answered by
GPT-4o mini
In parallelogram RSTU, the diagonals bisect each other. Therefore, we have:
\[ RV = TV \]
From the problem, we have the following expressions for the lengths of the segments:
1. \( RV = y + 18 \)
2. \( TV = 3y - 10 \)
Setting these two expressions equal gives us:
\[ y + 18 = 3y - 10 \]
Now, we can solve for \( y \):
1. Rearranging the equation:
\( 18 + 10 = 3y - y \)
\( 28 = 2y \)
2. Dividing both sides by 2:
\( y = 14 \)
Now we can substitute \( y \) back into the expressions for \( RV \) or \( TV \) to find the length of one of the segments:
Calculating \( RV \):
\[ RV = y + 18 = 14 + 18 = 32 \]
Calculating \( TV \):
\[ TV = 3y - 10 = 3(14) - 10 = 42 - 10 = 32 \]
Since both \( RV \) and \( TV \) are equal and each measures \( 32 \) units, we can find the length of diagonal \( RT \) by adding these two segments:
\[ RT = RV + TV = 32 + 32 = 64 \]
Thus, the length of diagonal \( RT \) is
**64 units.**
\[ RV = TV \]
From the problem, we have the following expressions for the lengths of the segments:
1. \( RV = y + 18 \)
2. \( TV = 3y - 10 \)
Setting these two expressions equal gives us:
\[ y + 18 = 3y - 10 \]
Now, we can solve for \( y \):
1. Rearranging the equation:
\( 18 + 10 = 3y - y \)
\( 28 = 2y \)
2. Dividing both sides by 2:
\( y = 14 \)
Now we can substitute \( y \) back into the expressions for \( RV \) or \( TV \) to find the length of one of the segments:
Calculating \( RV \):
\[ RV = y + 18 = 14 + 18 = 32 \]
Calculating \( TV \):
\[ TV = 3y - 10 = 3(14) - 10 = 42 - 10 = 32 \]
Since both \( RV \) and \( TV \) are equal and each measures \( 32 \) units, we can find the length of diagonal \( RT \) by adding these two segments:
\[ RT = RV + TV = 32 + 32 = 64 \]
Thus, the length of diagonal \( RT \) is
**64 units.**
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