Advertisements
Advertisements
प्रश्न
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.
उत्तर
The dimensions of the building are calculated as below.
Length = 1 × 50 m = 50 m
Breadth = 0.60 × 50 m = 30 m
Height = 1.20 × 50 m = 60 m
Thus, the actual dimensions of the building are 50 m × 30 m × 60 m.
i. Floor area of the room of the building
= `50 xx (50/1)^2`
= 125000 cm2
= `(125000)/(100 xx 100)`
= 12.5 m2
ii. Volume of the model of the building
`90(1/50)^3 = 90 xx (1/50) xx (1/50) xx (1/50)`
= `90 xx ((100xx100xx100)/(50xx50xx50)) cm^3`
= 720 cm3
APPEARS IN
संबंधित प्रश्न
PQR is a triangle. S is a point on the side QR of ΔPQR such that ∠PSR = ∠QPR. Given QP = 8 cm, PR = 6 cm and SR = 3 cm.
- Prove ΔPQR ∼ ΔSPR.
- Find the length of QR and PS.
- `"area of ΔPQR"/"area of ΔSPR"`
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
Given : AB || DE and BC || EF. Prove that :
- `(AD)/(DG) = (CF)/(FG)`
- ∆DFG ∼ ∆ACG
Triangle ABC is an isosceles triangle in which AB = AC = 13 cm and BC = 10 cm. AD is
perpendicular to BC. If CE = 8 cm and EF ⊥ AB, find:
i)`"area of ADC"/"area of FEB"` ii)`"area of ΔAFEB"/"area of ΔABC"`
An aeroplane is 30 m long and its model is 15 cm long. If the total outer surface area of the model is 150 cm2, find the cost of painting the outer surface of the aeroplane at the rate of Rs.120 per sq. m. Given that 50 sq. m of the surface of the aeroplane is left for windows.
In the given figure, triangle ABC is similar to triangle PQR. AM and PN are altitudes whereas AX and PY are medians.
Prove that : `(AM)/(PN)=(AX)/(PY)`
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.
In a triangle PQR, L and M are two points on the base QR, such that ∠LPQ = ∠QRP and ∠RPM = ∠RQP. Prove that:
- ΔPQL ∼ ΔRPM
- QL × RM = PL × PM
- PQ2 = QR × QL
A triangle ABC with AB = 3 cm, BC = 6 cm and AC = 4 cm is enlarged to ΔDEF such that the longest side of ΔDEF = 9 cm. Find the scale factor and hence, the lengths of the other sides of ΔDEF.
Two isosceles triangles have equal vertical angles. Show that the triangles are similar. If the ratio between the areas of these two triangles is 16 : 25, find the ratio between their corresponding altitudes.
