1. The volume of dirt removed from a well is 99 cu/meters. Assuming it is spread around the well in a flattened doughnut shape, the area of the dirt embankment is 88 sq/m. Dividing the volume by the area gives a height of 1.125 meters for the embankment.
2. The radius of a solid cylinder is 7 cm and its total surface area is given as 1628 cm^2. Using the surface area formula and the information that radius + height = 37 cm, the height is calculated to be 30 cm. The volume is 4620 cm^3.
3. In a right triangle with hypotenuse 100 m, the side opposite the 60
1. The volume of dirt removed from a well is 99 cu/meters. Assuming it is spread around the well in a flattened doughnut shape, the area of the dirt embankment is 88 sq/m. Dividing the volume by the area gives a height of 1.125 meters for the embankment.
2. The radius of a solid cylinder is 7 cm and its total surface area is given as 1628 cm^2. Using the surface area formula and the information that radius + height = 37 cm, the height is calculated to be 30 cm. The volume is 4620 cm^3.
3. In a right triangle with hypotenuse 100 m, the side opposite the 60
1. The volume of dirt removed from a well is 99 cu/meters. Assuming it is spread around the well in a flattened doughnut shape, the area of the dirt embankment is 88 sq/m. Dividing the volume by the area gives a height of 1.125 meters for the embankment.
2. The radius of a solid cylinder is 7 cm and its total surface area is given as 1628 cm^2. Using the surface area formula and the information that radius + height = 37 cm, the height is calculated to be 30 cm. The volume is 4620 cm^3.
3. In a right triangle with hypotenuse 100 m, the side opposite the 60
1. The volume of dirt removed from a well is 99 cu/meters. Assuming it is spread around the well in a flattened doughnut shape, the area of the dirt embankment is 88 sq/m. Dividing the volume by the area gives a height of 1.125 meters for the embankment.
2. The radius of a solid cylinder is 7 cm and its total surface area is given as 1628 cm^2. Using the surface area formula and the information that radius + height = 37 cm, the height is calculated to be 30 cm. The volume is 4620 cm^3.
3. In a right triangle with hypotenuse 100 m, the side opposite the 60
−4 k −6 =0 k +1 3 k =− 2 1 8 LCM Minimum distance = LCM of 80,85& 90 1 = 12240 1 9 6 1 p(A perfect square number) = 48 1 10 p(Divisible by 5) = 48 10 p(prime number on each dice) = 9/36 1 p(sum is 9 or 11) = 6/36 1 11 For unique solution
6 2 ≠ k 1 1
k≠ 3 1 12 a = 18 d = -2 n S n = [36+(n−1 )(−2)] 2 n 0= [ 36+( n−1)(−2 )] 1 2 n=19 1 13 Suppose that n is divisible by 3. Then, we can write: 1 n = 3k, for some integer k.
Then, n + 2 = 3k + 2 and n + 4 = 3k + 4 are both not divisible by 3 since:
(n + 2)/3 = k + 2/3 and (n + 4)/3 = k + 4/3 = (k + 1) + 1/3,
which shows that n + 2 and n + 4 leave remainders of 2 and 1 respectively when 1
divided by 3.
In a similar fashion, if n + 2 is divisible by 3, then:
n + 2 = 3k, for some integer k.
Then, n = (n + 2) - 2 = 3k - 2 and n + 4 = (n + 2) + 2 = 3k + 2 are both not divisible 1
by 3 (this can be shown similarly to the above). Similarly, if n + 4 is divisible by 3, both n and n + 2 are not divisible by 3.
1 OR . Given: ABCD is a rhombus in which diagonals AC and BD intersect at O. To Prove: AB2+BC2+CD2+DA2=AC2+BD2 Proof: As diagonals of a rhombus intersect/bisect each other at 900 hence ∆AOD,∆BOA,∆COB and ∆DOC are right triangles and OD = OB= BD/2 OA = OC = AC/2 Now by Pythagoras Theorem,
after three year daughter age=y+3 Than according to question x+3=2(y+3)+10 x-2y=13............(2) 1 put the value of equation (1) in equation(2) than 3y+3-2y=13 y=10 put the value of y in equation (1) than x=3(10)+3 x=33 Hence present age of women is 33 1 present age of daughter is 10
18 If x = a is the zero of p(x)
Then (x –a) is factor of p(x) Therefore, As x = √5 /3 and x = -√5 /3 are zeroes of p(x) Therefore (x - √ 5/3) ( x + √ 5/3) is factor of p(x) ( x2 – 5/3) is the required factor Or 3 x2 – 5 is the required factor 1 Now On Dividing 3x4 + 6x3 – 2x2- 10x – 5 by 3 x2 – 5 we get the quotient x2 + 2x +1 Other zeros are given by x2 + 2x +1= 0 x2 + x + x + 1 =0 x( x +1) +1 ( x +1) =0 2 x +1 =0 or x +1 = 0 x = -1 or x = -1 x= -1,-1,√ 5/3, -√ 5/3 are zeroes of given polynomials.
20 The volume of the dirt removed from a well is a cylinder shape, the formula
V= therefore (the radius is half the diameter)
V= V = 99 cu/meters of dirt 1
: Assuming it is to be spread around the well. (like a flattened doughnut) Find the area of the whole thing minus the well. Radius, 1.5+4 = 5.5 m
A= = = 7(approx.) A = 95 - 7 A = 88 sq/m area of the dirt around the well 1
Divide the vol of the dirt, by the area of the dirt to get the height
= 1.125 meters high, 4 meters wide, is the embankment
1
OR
Let r and h be the radius and height of the solid cylinder respectively. Given, r + h = 37 cm 1 Total surface area of the cylinder = 1628 cm2 (Given)
∴ 2 πr (r + h) = 1628 cm2
⇒ 2 πr × 37 cm = 1628 cm2
1 ⇒ r = 7 cm
r + h = 37 cm
∴ 7 cm + h = 37 cm
⇒ h = 37 cm – 7 cm = 30 cm
Volume of the cylinder = π r2h = 4620 cm3
Thus, the volume of cylinder is 4620 cm3.
21 Diagram Let us mark the four unshaded regions as I, II, III and IV. 1 Area of I + Area of III = Area of ABCD – Areas of two semicircles of each of radius 5 cm = 21.5 cm2 1 Similarly, Area of II + Area of IV = 21.5 cm2 So, area of the shaded design = Area of ABCD – Area of (I + II + III + IV) 1 = (100 – 2 × 21.5) cm2 = (100 – 43) cm2 = 57 cm2 22 2 cot(90-82)0 cot 450 cot(90-73)0 cot730 cot820 –3(Sin238+sin2(90-38)) 1 2 tan820 tan730 cot450 1/ tan820 1/tan730- 3(Sin238+Cos238) 1 2-3 1 -1 23 In right angle BCD BC BC 1 = Cot 60 0 = = DC 100 √ 3 1 100 m BC = √3 In rt. Angled ACD AC AC = Cot 300 = = √3 = AC = 100 √ 3 m DC 100 1 Distance b/w two ships = AB AC – BC
100 200 × √3 100 √3 − = = 115. 47m = √3 3 2
24 3 1
For correct steps
25 Let the number of articles produced be x.
Therefore, cost of production of each article = Rs (2x + 3) It is given that the total production is Rs 90. 1
−15 Either 2x + 15 = 0 or x − 6 = 0, i.e., x = or x = 6 2 1 As the number of articles produced can only be a positive integer, therefore, x can only be 6. Hence, number of articles produced = 6 Cost of each article = 2 × 6 + 3 = Rs 15 1 For correct value
27 Given that volume of the frustum(V) = 12308.8cm3
Also radii of the top (r1) = 12 cm
Radii of the bottom (r2) = 20 cm
Using Volume of frustum of cone 1 h = 15 cm
Also we know that
l2 = h2+ (r1-r2)2
l2 = 225 + 64
l2= 289
l=17cm 1
Now the bucket will be open at the top and so the area of the metal sheet used in making the bucket (Say A)
A= lateral surface of the frustum + (area of circle at the bottom with r2 = 20cm) 1 A= π(r1+r2)l + πr2 = 3.14x(12+20) x 17 + 3.14x (20)2 = 3.14x32x17 + 3.14x400 = 1708.16 + 1256 1 = 2964.16 cm2 28 LHS= cosA – cosA cot A – cosA sinA = 1 cotA +cosA cosA +cosA sinA Taking cos A common from numerator and denominator cosA (1−sinA ) 1 cosA (1+ sinA ) (1−sinA) (1+ sinA) Dividing numerator and denominator by sinA, we get 2
cosec A – 1 =RHS cosec A +1 29 For given, to prove , construction and fig 2 For correct proof 2 OR
For given, to prove , construction and fig 2
For correct proof 2
30 Class-Interval Frequency CF 0-6 4 4 6-12 x 4+x 12-18 5 9+x 1 18-24 y 9+x+y 24-30 1 10+x+y Median=12+{10-x-4/5}x6 x=4 y=6 1 2
OR Heights(in cm) Number of Persons More than 145 60 More than 150 52 More than 155 42 More than 160 27 More than 165 18 More than 170 8
