Advertisements
Advertisements
प्रश्न
The ratio between the areas of two similar triangles is 16 : 25. State the ratio between their :
- perimeters.
- corresponding altitudes.
- corresponding medians.
उत्तर
ΔABC ∼ ΔDEF, AL ⊥ BC and DM ⊥ EF and AP and DQ are the medians and also area ΔABC : area ΔDEF = 16 : 25
∵ ΔABC ~ ΔDEF ...(Given)
∴ `(Area ΔABC)/(Area ΔDEF) = (AB^2)/(DE^2)`
`\implies (AB^2)/(DE^2) = 16/25 = (4)^2/(5)^2`
∴ `(AB)/(DE) = 4/5` or AB : DE = 4 : 5 ...(i)
∵ ΔABC ∼ ΔDEF
∴ ∠B = ∠E and `(AB)/(DE) = (BC)/(EF)` ...(i)
i. ∵ ΔABC ∼ ΔDEF
∴ `(AB)/(DE) = (BC)/(EF) = (CA)/(FD)`
= `(AB + BC + CA)/(DE + EF + FD)`
= `4/5` ...[From (i)]
∴ The ratio between two perimeters = 4 : 5
ii. Now, in ΔABC and ΔDEM,
∴ ∠B = ∠E, ∠L = ∠M ...(Each 90°)
∴ ΔABL ∼ ΔDEM ...(AA criterion of similarity)
∴ `(AB)/(DE) = (AL)/(DM) = 4/5` ...[From (i)]
∵ AL : DM = 4 : 5
iii. ΔABC ∼ ΔDEF, ∠B = ∠E and
`(AB)/(DE) = (BC)/(EF) = (2BP)/(2EQ) = (BP)/(EQ)`
∴ ΔABD ∼ ΔDEQ
∴ `(AB)/(DE) = (AP)/(DQ) = 4/5` ...[From (i)]
∴ AB : DE = 4 : 5
APPEARS IN
संबंधित प्रश्न
In ∆ ABC, ∠B = 2 ∠C and the bisector of angle B meets CA at point D. Prove that:
(i) ∆ ABC and ∆ ABD are similar,
(ii) DC: AD = BC: AB
In ∆ABC, ∠B = 90° and BD ⊥ AC.
- If CD = 10 cm and BD = 8 cm; find AD.
- If AC = 18 cm and AD = 6 cm; find BD.
- If AC = 9 cm and AB = 7 cm; find AD.
Through the mid-point M of the side CD of a parallelogram ABCD, the line BM is drawn intersecting diagonal AC in L and AD produced in E. Prove that: EL = 2BL.
In the right-angled triangle QPR, PM is an altitude.
Given that QR = 8 cm and MQ = 3.5 cm, calculate the value of PR.
On a map, drawn to a scale of 1 : 20000, a rectangular plot of land ABCD has AB = 24 cm and BC = 32 cm. Calculate :
- the diagonal distance of the plot in kilometer.
- the area of the plot in sq. km.
The dimensions of the model of a multistoreyed building are 1 m by 60 cm by 1.20 m. If the scale factor is 1 : 50, find the actual dimensions of the building.
Also, find:
- the floor area of a room of the building, if the floor area of the corresponding room in the model is 50 sq. cm.
- the space (volume) inside a room of the model, if the space inside the corresponding room of the building is 90 m3.
The following figure shows a triangle ABC in which AD and BE are perpendiculars to BC and AC respectively.
Show that:
- ΔADC ∼ ΔBEC
- CA × CE = CB × CD
- ΔABC ~ ΔDEC
- CD × AB = CA × DE
In the give figure, ABC is a triangle with ∠EDB = ∠ACB. Prove that ΔABC ∼ ΔEBD. If BE = 6 cm, EC = 4 cm, BD = 5 cm and area of ΔBED = 9 cm2. Calculate the:
- length of AB
- area of ΔABC
In the given figure, ABC is a right angled triangle with ∠BAC = 90°.
- Prove that : ΔADB ∼ ΔCDA.
- If BD = 18 cm and CD = 8 cm, find AD.
- Find the ratio of the area of ΔADB is to area of ΔCDA.
In fig. ABCD is a trapezium in which AB | | DC and AB = 2DC. Determine the ratio between the areas of ΔAOB and ΔCOD.
