Respuesta :

You can use the similarity approach of these two triangles CBD and CAE

as a result:
[tex] \frac{BD}{AE} = \frac{10}{2x} = \frac{CD}{CE} = \frac{3x}{?} [/tex]

so:
? = 6x^2 / 10 = 0.6 x^2

and the fact of:

"The segment connecting the midpoints of two sides of a triangle is parallel to the third side and equals its half length"

so:BD = 0.5 AE        10 = 0.5 * 2x        >>> x= 10


Back to:
? =0.6 x^2 = 0.6 * 10^2 = 0.6 * 100 = 60



A

Hope that helps
Banabanana
In a triangle the midline joining the midpoints of two sides is parallel to the third side and half as long ⇒

AE = BD*2 = 10*2 = 20
also AE = 2x (given) ⇒
2x = 20
x = 20/2
x = 10

CD = 3x = 3*10 = 30

BD is the midsegment of ΔACE ⇒ ΔBCD ∼ ΔACE therefore:

[tex] \frac{BD}{CD}= \frac{AE}{CE} \ \ \ \to \ \ \ CE= \frac{CD*AE}{BD}= \frac{30*20}{10}=60 [/tex]

Answer: 60
RELAXING NOICE
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