Add 6 to both sides and you get your final answer.
Recall that a rhombus is a particular kind of parallelogram: the length you are looking for will be half of the parallelogram's height.
First, find the second diagonal of the rhombus:
d₂ = 2·A / d₁
= 2·480 / 48 *we transformed the units of measurement from dm to cm
= 20 cm
Now, consider the small triangle rectangle formed by the side of the rhombus and the halves diagonals. You can apply the Pythagorean theorem in order to find the side:
s = √[(d₁ /2)² + (d₂ / 2)²]
=√[(48 / 2)² + (20 / 2)²]
= 26 cm
Now, the side of the rhombus is the base of the parallelogram, therefore:
h = A / s
= 480 / 26
= 18.46 cm
The distance between <span>the point of intersection of the diagonals and the side of the rhombus will be:
</span><span>18.46 </span>÷ 2 = 9.23 cm
Answer:
(4,0)
Step-by-step explanation:
First, when you move left from the point (2,5) you end up in the point (4,5).
Next, you move down 5 units from (4,5) and end with the answer of (4,0).
I hope this helps!
Answer:
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Answer:
A suits the most
Step-by-step explanation: