Only a, b and, d are true.
Line RS intersects triangle BCD at two points and is parallel to segment DC. Triangle B C D is cut by line R S. Line R S goes through sides D B and C B. Lines DC and RS are parallel. width= Which statements are correct? Select three options.
a.) △BCD is similar to △BSR.
b.) BR/RD = BS/SC
c.) If the ratio of BR to BD is Two-thirds, then it is possible that
BS = 6 and BC = 3.
d.) (BR)(SC) = (RD)(BS)
e.) BR/ RS = BS/SC
1. We know that the angles on the same side of the transversal are equal, also, RS is parallel to DC. Thus,
∠BDC = ∠BRS,
∠BCD = ∠BSR,
And we can write that ∠CBD = ∠CBD because they are the common angle of the two triangles.
Therefore, ΔBCD ~ ΔBSR, the using Angle, Angle Angle (AAA) property for similar triangles.
2. Now, As already discussed ΔBCD ~ ΔBSR, using the Angle, Angle Angle (AAA) property for the similar triangle.
[tex]\dfrac{BC}{BS} = \dfrac{BD}{BR}\\\\\\\dfrac{(BS + SC)}{BS} = \dfrac{(BR + RD)}{BR}\\\\\\1 + \dfrac{SC}{BS} = 1+\dfrac{RD}{BR}\\\\\\\dfrac{SC}{BS} = \dfrac{BR}{RD}\\\\[/tex]
Inverting both sides,
[tex]\dfrac{BR}{RD} = \dfrac{BS}{SC}[/tex]
Therefore, [tex]\dfrac{BR}{RD} = \dfrac{BS}{SC}[/tex] is true.
3. From the above observation, , we can write
[tex]\dfrac{BR}{RD} = \dfrac{BS}{SC}\\\\BR\times SC = RD\times BR\\\\[/tex]
Therefore, the (BR)(SC) = (RD)(BR) is true.
Hence, only a, b and, d are true.
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