Advertisements
Advertisements
प्रश्न
The given diagram shows two isosceles triangles which are similar. In the given diagram, PQ and BC are not parallel; PC = 4, AQ = 3, QB = 12, BC = 15 and AP = PQ.
Calculate:
- the length of AP,
- the ratio of the areas of triangle APQ and triangle ABC.
उत्तर
i. Given, ΔAQP ~ ΔACB
`=> (AQ)/(AC) = (AP)/(AB)`
`=> (3)/(4 + AP) = (AP)/(3 + 12)`
`=>` AP2 + 4AP – 45 = 0
`=>` (AP + 9)(AP – 5) = 0
`=>` AP = 5 units ...(As length cannot be negative)
ii. Since, ΔAQP ~ ΔACB
∴ `(ar(ΔAPQ))/(ar(ΔACB)) = (PQ^2)/(BC^2)`
`=> (ar(ΔAPQ))/(ar(ΔABC)) = (AP^2)/(BC^2)` ...(PQ = AP)
`=> (ar(ΔAPQ))/(ar(ΔABC)) = (5/15)^2 = 1/9`
APPEARS IN
संबंधित प्रश्न
In figure, ∠CAB = 90º and AD ⊥ BC. If AC = 75 cm, AB = 1 m and BD = 1.25 m, find AD.
State, true or false:
Two isosceles-right triangles are similar.
In each of the given pairs of triangles, find which pair of triangles are similar. State the similarity criterion and write the similarity relation in symbolic form:
The corresponding altitudes of two similar triangles are 6cm and 9cm respectively. Find the ratio of their areas.
In Δ ABC , DE is parallel to BC and `"AD"/"DB" = 2/7` IF AC = 5 .6 , find AE.
If ΔPQR, AB is drawn parallel to QR. If PQ = 9cm, PR = 6cm and PB = 4.cm, find the length of AP.
Prove that the external bisector of an angle of a triangle divides the opposite side externally n the ratio of the sides containing the angle.
In the figure, AB || RQ and BC || SQ, prove that `"PC"/"PS" = "PA"/"PR"`.
A vertical stick of length 6 m casts a shadow 400 cm long on the ground and at the same time a tower casts a shadow 28 m long. Using similarity, find the height of the tower
In triangle ABC point D is on side BC (B−D−C) such that ∠BAC = ∠ADC then prove that CA2 = CB × CD
