Advertisements
Advertisements
प्रश्न
In the given figure YH || TE. Prove that ΔWHY ~ ΔWET and also find HE and TE
उत्तर
| Statements | Reasons |
| 1. ∠EWT = ∠HWY | Common angle |
| 2. ∠ETW = ∠HYW | Since YH || TE, corresponding angles |
| 3. ∠WET = ∠WHY | Since YH || TE corresponding angles |
| 4. ΔWHY ~ ΔWET | By AAA criteria |
Also ΔWHY ~ ΔWET
∴ Corresponding sides are proportionated
`"WH"/"WE" = "HY"/"ET" = "WY"/"WT"`
`6/(6 + "HE") = 4/"ET" = 4/16`
`6/(6 + "HE") = 4/16`
⇒ 6 + HE = `6/4 xx 16`
⇒ 6 + HE = 24
∴ HE = 24 – 6
HE = 18
Again `4/"ET" = 4/16`
ET = `4/4 xx 16`
ET = 1 × 16
ET = 16
APPEARS IN
संबंधित प्रश्न
D is a point on the side BC of ∆ABC such that ∠ADC = ∠BAC. Prove that` \frac{"CA"}{"CD"}=\frac{"CB"}{"CA"} or "CA"^2 = "CB" × "CD".`
In figure, ∠A = ∠CED, prove that ∆CAB ~ ∆CED. Also, find the value of x.
State, true or false:
Two isosceles-right triangles are similar.
In the given figure, BC is parallel to DE. Area of triangle ABC = 25 cm2, Area of trapezium BCED = 24 cm2 and DE = 14 cm. Calculate the length of BC. Also, find the area of triangle BCD.
In Δ ABC , DE is parallel to BC and `"AD"/"DB" = 2/7` IF AC = 5 .6 , find AE.
In ΔABC, MN is drawn parallel to BC. If AB = 3.5cm, AM : AB = 5 : 7 and NC = 2cm, find:
(i) AM
(ii) AC
In the figure, PQR is a straight line and PS || RT. If QS = 12cm, QR = 15cm, QT = 10cm and RT = 6cm, find PQ and PS.
A map is drawn to scale of 1:20000. Find: The distance on the map representing 4km
If ΔABC ~ ΔLMN and ∠A = 60° then ∠L = ?
In fig., seg AC and seg BD intersect each other at point P.
`"AP"/"PC" = "BP"/"PD"` then prove that ΔABP ~ ΔCDP
