XAT 2011 Question Paper - QUANT

Number of teams in the bottom group $$= 10$$
Let the total number of teams in top group = $$n$$
Total number of teams $$ = 10 + n$$

=> Number of matches played amongst the bottom group teams = $$^{10}C_2$$
= $$\frac{10 \times 9}{1 \times 2} = 45$$

Number of points bottom group teams get playing amongst themselves $$= 45\cdot1=45$$

Let the total number of teams in top group = $$n$$

wkt, "Each of the bottom ten teams earned half of their total points against the other nine teams in the bottom ten"
i.e. they get half the total points by playing amongst themselves and the other half of total points by playing with the top group teams.

Since they got 45points playing amongst themselves, the bottom teams get 45 points from their matches against top group teams, => 45 out of $$10 n$$ points
Total points by matches between top teams and bottom teams $$= 10\cdot{n}\cdot1 =10n$$ points

Number of points that top group teams get from matches playing amongst themselves = $$^nC_2$$

Number of points that top group gets against the bottom group = $$10n - 45$$

wkt, "Exactly half of the points earned by each team were earned in games against the ten teams which finished at the bottom of the table.". Therefore the top n teams obtained half points by playing amongst themselves and half the points by playing against bottom 10 teams.

=> $$^nC_2 = 10n - 45$$

=> $$n (n - 1) = 20n - 90$$

=> $$n^2 - 21n + 90 = 0$$

=> $$(n - 6) (n - 15) = 0$$

If, $$n = 6$$, top group would get = $$C^n_2 + 10n - 45$$

= $$C^6_2 + 60 - 45 = 30$$

Average points per game = $$\frac{30}{6} = 5$$

Bottom teams will get on an average = $$\frac{45 + 45}{10} = 9$$

This is not possible.

=> $$n = 15$$

$$\therefore$$ Total number of teams = $$15 + 10 = 25$$

Given : PQ = 10 , QT = 8 , RS = 7

Now, TQ*TP=TR*TS (Secant from same external point)

8(PQ+QT)=TR(TR+RS)

8*18=TR(TR+7)

TR=9

TS=9+7=16

$$\therefore ar (\triangle PTS) = \frac{1}{2} \times PT \times TS \times sin60 $$

= $$\frac{1}{4} \times (16 \sqrt{3}) \times 18$$

= $$72 \sqrt{3}$$

If the group had two members, the one in the first position would win.

If the group had three members, the one in the third position would win.

If the group had four members, the one in the first position would again win.

Similarly, for five members, the one in the third position will win

Similarly, for six members, the one in the fifth position will win.

So, for f(2n), the one at 2f(n)-1 will win

And for f(2n+1) members, the one at 2f(n)+1 will win.

When 2n = 2, the winner will be 1.

For 2n = 4, winner will be 2f(2) - 1. And since f(2)=1, for f(4), the winner will be 1.

Now, f(545) = 2f(242) + 1

f(272) = 2f(136) - 1

f(136) = 2f(68) - 1

f(68) = 2f(34) - 1

f(34) = 2f(17) - 1

f(17) = 2f(8) + 1

f(8) = 2f(4) - 1

f(4) = 2f(2) - 1

Since f(2) = 1, f(4) = 1,f(8) = 1,.......f(545) = 67

Thus, the correct option is B.

For f(2n), the one at 2f(n)-1 will win.

And for f(2n+1) members, the one at 2f(n)+1 will win.

When 2n = 2, the winner will be 1.

For 2n = 4, winner will be 2f(2) - 1. And since f(2)=1, for f(4), the winner will be 1.

Now, f(545) = 2f(242) + 1

f(272) = 2f(136) - 1

f(136) = 2f(68) - 1

f(68) = 2f(34) - 1

f(34) = 2f(17) - 1

f(17) = 2f(8) + 1

f(8) = 2f(4) - 1

f(4) = 2f(2) - 1

Since f(2) = 1, f(4) = 1,f(8) = 1, f(17)= 3,f(34)= 5, f(68) = 9, f(136) = 17, f(272) = 33, f(545) = 67

Now, f(544) = 65, f(543) = 63....

So when every second member is removed, for f(n) = A, f(n - m) = A - 2m.

When every x member is removed and f(n) = A, f(n - m) = A - x*m.

If A > f(n), then f(n) = A % f(n)...(i)

Now, f(542) = 437, and x = 300

f(543) = 437 + 300 = 637 % 543 = 194

f(544) = 196 + 300 = 494

f(545) = 496 + 300 = 794 % 545 = 249

Thus, the correct option is C.

Little Pika can add   (1000, 1001), (1001, 1002), (1002, 1003), (1003, 1004), (1004, 1005) and (1009, 1010).

Similarly, he can add (1010, 1011), (1011, 1012), (1012, 1013), (1013, 1014), (1014, 1015) and (1019, 1020).

Similarly, he can add (1020, 1021), (1021, 1022), (1022, 1023), (1023, 1024), (1024, 1025) and (1029, 1030).

Similarly, he can add (1030, 1031), (1031, 1032), (1032, 1033), (1033, 1034), (1034, 1035) and (1039, 1040).

Similarly, he can add (1040, 1041), (1041, 1042), (1042, 1043), (1043, 1044) , (1044, 1045) and (1049, 1050).

We can see that there are 30 cases when we have changed unit and tens digit. Now the hundreds digit can be anything from {0, 1, 2, 3, 4}. 

Hence, total number of such pairs which Pika can add = 5*30 = 150. 

He can also number of form, (1099, 1100), (1199, 1200), (1299, 1300), (1399, 1400) (1499, 1500) and (1999, 2000) 

Therefore, we can say that Pika can add 150+6 = 156 numbers. Hence, option C is the correct answer. 

There are 20 cities and one direct road between any 2 cities.

=> Total number of paths = $$C^{20}_2$$

= $$\frac{20 \times 19}{1 \times 2} = 190$$

Now, each candidate needed to visit all the cities and then come back to the city he started from

=> Paths taken by each candidate = $$20$$

Let maximum number of candidates = $$n$$

=> $$20 n < 190$$

=> $$n < \frac{190}{20}$$

=> $$n < 9.5$$

$$\therefore$$ Maximum possible number of candidates = $$9$$

The meter skips all the numbers in which there is a 5

From, (1 to 99) -> 5 occurs 10 times in tens place and 10 times in units place (which also includes 55)

=> Total occurrence = $$10 + 10 - 1 = 19$$

Similarly from (100 to 199), from (200 to 299)..., from (400 to 499) , from (600 to 699),...from (900 to 999)

It occurs = $$8 \times 19 = 152$$

Now, from (500 to 599), there are 100 numbers, => micromanometer reading can change from 499 to 600.

Thus, total numbers skipped from (1 to 999) = $$19 + 152 + 100 = 271$$

Similarly, from (1000 to 1999) = 271

and from (2000 to 2999) = 271

Also, 3005 and 3015 are also skipped

=> Total number of skips = $$271 + 271 + 271 + 2 = 815$$

$$\therefore$$ Actual pressure = $$3016 - 815 = 2201$$

Given : Side of square = CD = 60 cm

=> AB = CD = 60 cm , => Radius of circles centered at A and D have equal radius of 60 cm

To find : OP = $$r = ?$$

Solution : $$AO = 60 - r$$ and $$AQ = OP = r$$

In $$\triangle$$ AOQ

=> $$(OQ)^2 = (AO)^2 - (AQ)^2$$

=> $$(OQ)^2 = (60 - r)^2 - (r)^2$$

=> $$(OQ)^2 = 3600 - 120r + r^2 - r^2$$

=> $$(OQ)^2 = 3600 - 120r$$

Now, $$OD = 60 + r$$ and $$QD = 60 - r$$

In $$\triangle$$ DOQ

=> $$(OD)^2 = (QD)^2 + (OQ)^2$$

=> $$(60 + r)^2 = (60 - r)^2 + (3600 - 120r)$$

=> $$(3600 + 120r + r^2)$$ = $$(3600 - 120r + r^2) + (3600 - 120r)$$

=> $$120r + 120r + 120r = 3600$$

=> $$r = \frac{3600}{360} = 10 cm$$

Given : $$e = 4$$

$$FD = 48$$, => $$a + b + d + e = 48$$

$$d = 2b$$ and $$d = 4e$$

$$SA = 124$$, => $$d + e + f + g = 124$$

$$d = e + f$$ and $$h = 59$$

To find : $$c = ?$$

Solution : $$d = 4e = 4 \times 4 = 16$$

=> $$b = \frac{d}{2} = \frac{16}{2} = 8$$

=> $$f = d - e = 16 - 4 = 12$$

=> $$a = 48 - b - d - e = 48 - 8 - 16 - 4 = 20$$

=> $$g = 124 - d - e - f = 124 - 16 - 4 - 12 = 92$$

Now, we know that, $$a + b + c + d + e + f + g + h = 240$$

=> $$20 + 8 + c + 16 + 4 + 12 + 92 + 59 = 240$$

=> $$c + 211 = 240$$

=> $$c = 240 - 211 = 29$$

$$(PL + PN)$$ will be minimum if P lies on LN, and $$(PM + PO)$$ will be minimum if P lies on OM.

=> P must be the intersection point of the diagonals of the quadrilateral.

$$\therefore$$ Min (PL + PM + PN + PO)

= $$LN + OM$$

= $$(\sqrt{(0 + 5)^2 + (5 - 0)^2}) + (\sqrt{(1 + 1)^2 + (-1 - 5)^2})$$

= $$(\sqrt{25 + 25}) + (\sqrt{4 + 36})$$

= $$\sqrt{50} + \sqrt{40} = 5 \sqrt{2} + 2 \sqrt{10}$$