# Quant Boosters - Geometry - Raman Sharma - Set 2

• Q3) In triangle ABC, angle bisectors AD and BE intersected at P. If the sides of triangle are 3, 5, 7 opposite to A, B, C respectively and BP = x and PE = y , compute for the ratio x:y where x and y are relatively prime integers.

[OA: 2 : 1]

• Credits : Sahabudeen Salaeh

• Q4) A semicircle is inscribed in an equilateral triangle as shown. What fraction of the triangle lies inside the semicircle?

[OA: √3π/8 ]

• Q5) In ∆ABC , AD ia the altitude from A onto the side BC. If b > c , angle C =23° and AD = abc/(b² - c²) , then angle B is equal to
a. 83°
b. 113°
c. 123°
d. 75°
e. NoT

[OA: 113]

• Q6) On a circle 26 equidistant points are marked. These points are joined to form triangles. Of the triangles formed, how many of them will have their circumcenter on one of their sides?

[OA : 312]

• Q7) ABCD is a square with side length r units .
AB is trisected by two points R and S ,
CD is trisected by two points P and Q ,
AP and DR intersect at E
AP and DS intersect at N
AQ and DR intersect at M
AQ and DS intersect at F
What is the area of the quadrilateral EMFN ?

[OA: (r/6)^2]

• Credits : Turan Bey

• Q8) In the square ABCD , a line through B intersects the extension of CD at E , the side AD at F and the diagonal AC at G if BG = 9 and GF = 3 , then what is the length of EF ?

[OA: 24]

• Q9) Two of the sides of a triangle are in the ratio 3:4. The medians to these sides are perpendicular to each other. If the third side of the triangle is 12root(5), find the smaller of the first two sides of the triangle.

[OA: 36]

• Q10) The shortest median of a right-angled triangle is 25 units. If the area of the triangle is 336 sq.units, what is the length (in units) of the longest median of the triangle?

[OA: 48.5]

• Q11) In triangle ABC, two lines DE and FG are drawn parallel to BC such that they divide AC in the ratio 2:3:5. Find the ratio of area of triangle ABC to area of the trapezium DEGF.

[OA: 100 : 21]

• Q12) The parallel sides of Trapezium is 6 and 8 units respectively. Find the length of the line segment parallel to these sides and which divides the area of trapezium in equal halves.
A. 4 √3
B. 5 √ 2
C. 7
D. 7/√2

[OA: Option b]

• credits : @swetabh_kumar

let length be x..so 1/2 * (6x) * h1= 1/2 * (1/2 * 14 * h2)..h1 is the height of the smaller trapezium...h2 is overall heght.
so (6+x)h1=7h2
now the line of legth x is divided into length 6 and 2 equal corner segments of legth (x-6)/2 each.
by similar triangles, h1/h2= (x-6)/2.
plug in the 1st eqn7/(6+x)=(x-6)/2
x^2 - 36 = 14
x = 5 root 2

• Q13) What is the ratio of area of a regular dodecagon (a polygon with 12 sides) to the area of a regular hexagon if both the polygons are inscribed in the same circle?

[OA: 2 : √3]

• Q14) In a triangle ABC AB = AC and angle BAC = 100°. AB is produced to D such that AD = BC. find angle BCD.

[OA: 10]

• Q15) There are 7 smaller squares inside the large rectangle. If the green square has side length 1 and the brown square has side length 2, what is the area of the rectangle?

[OA: 63]

64

47

61

61

61

63

53

61