Friday, April 18, 2008

coaching centers for mba prepration

Coaching Centers/Site information

The best site for CAT exam, esp. the EU test and DRISHTI in the site are really
good collections. The best thing about the site is that all the materials are for
free. You don't need to be a student of PT to access them. All the MBA related
exam patterns are also there.

http://www.careerlauncher.com/Another excellent site but the problem is that to get the full access you need to be a CL student.
The discussion forum is the best and the faculties always answers to the quires

http://www.time4education.com/The only institute which can say they had prepared MOCK CAT with the standard of CAT 05.
Site is not so good. The discussion forum is bad to say the least.

http://www.cflogic.com/A good inst and also has a good site for its student.

http://www.imsindia.com/SO called the biggest CAT coaching center of India but of late they have started giving importance
to many other things except the CAT. You can visit this site to get the admission advt of any B
school if u‘ve missed that in news paper.

http://www.primetutor.com/Institute for all the competitive exams.Do we need to write any thing more!

http://www.erudite.in/The best institute in kolkata as said by the pundits.
If you like to spend a huge amount on your preparation then go for it . They don’t have any all india mock test.

http://www.ascenteducatio.com/ a good looking & professionally managed site

CEREBRAL HEIGHTS - EXCEED YOUR POTENTIAL

COURSES. MBA Entrance Training · Campus Recruitment · GD-PI Training · Corporate Training

www.ch-india.com


Every thing about number system

Number System

A Number is an abstract entity that represents a count or measurement.
All numbers fall in 2 categories Real Number, Complex Number
A Real Number can either be a Rational number or an irrational number.
Rational number can either be Natural numbers or Negative integers or Fractions

Natural Numbers
The natural numbers start off as follows: 1, 2, 3, 4, and 5 ... The "..." means that the list goes on forever.
We give this set the name N.

If a number is in N, then its successor is also in N. Thus, there is no greatest number, because we can always add one to get a larger one. N is an infinite set . Since it is infinite, N can never be exhausted by removing its members one at a time.

Whole Numbers
If we add zero to our above list then we have the set of whole numbers.
i.e Whole numbers 0,1,2,3...

Negative numbers

Negative numbers are numbers which are less than zero. They are used to indicate a number that is opposite to the corresponding positive number (the absolute value), but equal in magnitude.
Exampe: -1, -2, -3, . . .
Remember -(n + 1)is always smaller than -n where n is a positive number.

Integer

Integers are the whole numbers, negative whole numbers, and zero.
One of the numbers ..., -2, -1, 0, 1, 2, . . .
But numbers like 1/2, 4.00032, 2.5, Pi, and -9.90 are not integers.
Note that zero is neither positive nor negative.

It may help you to think of numbers as occurring along a line that stretches infinitely in both directions. Numbers to the left of the 0 point are negative, numbers to the right are positive.

Along this line are a series of dots that correspond to whole numbers (integers). The spaces between the whole numbers are occupied by the numbers that are not whole (they contain fractions, and are called real numbers ex.1/2, 4.00032, 2.5, Pi, and -9.90).

Even and Odd

The terms even and odd only apply to integers. A number is said to be an even number if it is divisible by 2 or else it is an odd number.
Even numbers are: 2, 4, 6, 8, 10. . . . .40, 42, 44,. . . 312, 314, .... 1008,1010, . . . .686860....
Odd numbers are: . . 5, 7, 9. . . . .41, 43, 45,. . . 311, 313, .... 1007,1009, . . . .686861....

2.5 is neither even nor odd.

Zero, on the other hand, is even since it is 2 times some integer: it's 2 times 0.
To check whether a number is odd, see whether it's one more than some even number: 7 is odd since it's one more than 6, which is even. Another way to say this is that zero is even since it can be written in the form 2*n, where n is an integer.Odd numbers can be written in the form 2*n + 1.

Again, this lets us talk about whether negative numbers are even and odd: -9 is odd since it's one more than -10, which is even.

Every positive integer can be factored into the product of prime numbers, and there's only one way to do it for every number . For instance, 280 = 2x2x2x5x7, and there's only one way to factor 280 into prime numbers

Rational Number

A rational number is a number that can be expressed as a fraction p/q where p and q are integers and q ≠ 0.
i.e Rational numbers are simply defined as ratios of integers. 1/2 is a rational number. 2/3 is also a rational number.

Note that all Of the integers are rational numbers, because you can think of them as the ratio of themselves to 1, as in 2 = 2/1 which is certainly the ratio of two integers, and so 2 is a rational number.
The decimal form of a rational number is either a terminating or repeating decimal.

Representation of rational numbers in decimal form
Any positive rational number p/q, after actual division, if necessary can be expressed as,
p / q = m + r/q where m is non-negative integer and 0 ≤ r < 5 =" 6" 5 ="">

There are few fractions for which the right most digit(or set of right most digit)recurrs endlessly. For example 1/3 =0.33333. . . .
and 5/11 = 0.45454 . . . .
Note that the dots ........ represent endless recurrence of digits.
The above examples are decimal numbers of the "non-terminating type".

In case of "non-terminating type" we have decimal fractions having an infinite number of digits. Some decimal fractions from this group have digits repeating infinitely. They are called "repeating or recurring " decimals.

In "endless recurring or infinite repeating" decimal fractions we can see that when p is actually divided by q the possible remainders are 1, 2, 3, ..... , q -1. So one of them has to repeat itself in q steps. Thereafter the earlier numeral or group of numerals must repeat itself.

All the rational numbers thus can be represented as a finite decimal (terminating type) or as a recurring decimal.

Irrational Numbers

In mathematics, an irrational number is any real number that is not a rational number i.e., one that cannot be written as a ratio of two integers, i.e., it is not of the form a/b where a and b are integers and b is not zero.

It can readily be shown that the irrational numbers are precisely those numbers whose expansion in any given base (decimal, binary, etc) never ends and never enters a periodic pattern.

The square root of 2 is a classic example of an irrational number: you cannot write it as the ratio of ANY two integers.

Prime number

A prime number is a whole number that is not the product of two smaller numbers.

Note that the definition of a prime number doesn't allow 1 to be a prime number : 1 only has one factor, namely 1.

Prime numbers have exactly two factors, not "at most two" or anything like that. When a number has more than two factors it is called a composite number.

Here are the first few prime numbers:
2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37, 41, 43, 47, 53, 59, 61, 67, 71, 73, 79, 83, 89, 97, 101, 103, 107, 109, 113, 127, 131, 137, 139, 149, 151, 157, 163, 167, 173, 179, 181, 191, 193, 197, 199, etc.

PRIME FACTORS
Suppose n is a natural number. Then there exists a unique sequence of prime
numbers p1, p2, p3, . . . , pm, such that both of the following statements are
true:
p1 ≤ p2 ≤ p3 ≤ . . . ≤ pm
p1 x p2 x p3 . . . x pm
The numbers p1, p2, p3, . . . , pm are called the prime factors of the natural number.

Every natural number n has one, but only one, set of prime factors.
This is an important principle known as the Fundamental Theorem of
Arithmetic.

Number of Prime Factors

A number N of the form
am x bn x cp
where a, b, c are all prime factors of number N


has (m + 1)(n + 1)(p + 1)no. of prime factors

What is the fastest way to determine if a number is Prime?
The easiest & simplest method is to divide the number up to the closet square root of that number.
Ex. Lets consider 53. Number close to 53 having a perfect square is 64 and its square root is 8. Now start dividing 53 from 2 to 8. There is no such number between 2 to 8 which divides 53 so 53 is a prime number. Related Links :Click to view the largest known prime number

Composite Numbers

A composite number is a positive integer which is not prime (i.e., which has factors other than 1 and itself). The first few composite numbers (sometimes called "composites" for short) are 4, 6, 8, 9, 10, 12, 14, 15, 16, . . .

Note that the number 1 is a special case which is considered to be neither composite nor prime.
Numeric Operations:
1. A + 0 = A , A - 0= A , A x 0 = 0 , A/0= Value Does not exist
2. A x 1= 1 , A + (-A) = 0 , A x (1/A) = 1
3. A + B = B + A
4.A x B = B x A
5. A ( B + C) = AB + AC

Integer Roots
Suppose that a is a positive real number. Also suppose that n is a positive integer. Then the n th root of a can also be expressed as the 1/ n power of a . Thus, the second root (or square root) is the same thing as the 1/2 power; the third root (or cube root) is the same thing as the 1/3 power; the fourth root is the same thing as the 1/4 power; and so on.

Irrational-Number Powers
Suppose that a is a real number. Also suppose that b is a rational number such that b = m / n , where m and n are integers and ≠ 0. Then the following formula holds true:
ab = am/n =a m(1/n ) =a (1/n ) m and
(1/a)b = 1/(ab
In Case of a negative power a-b = (1/a)b = 1/(a b )
Important Formula A(b+c) = Ab A c and A(b-c) = A b / A c

Let A be a real number. Let b and c be rational numbers. Then the following formula holds good:
A bc = ( Ab) c = ( Ac) b

CAT TRICKS

Divisibility rules
1. xn + anis exactly divisible by (x + a)
if n is odd, but not if n is even

2. xn - an is divisible by (x + a)
if n is even but not if n is odd
3. xn - an is always divisible by (x - a)

Remainder theorems
If a rational integral functions f(x) is divided by ( x + a) the remainder is f(-a)
Ex1: What is the remainder when x 2 - 3x + 2 is divided by (x - 2)
Ans: der = f-(-2)= f(2) = 4 - 6 + 2 = 0
Thats true beause x 2 - 3x + 2 = (x - 2)(x - 1)
Ex2: Find a if (ax3 + 3x2 - 3) and (2x3 - 5x + a) when divided by (x-4) leave same rmainder.
Ans: remainders are,
R1 = f(4) = a(4)3+ 3(4)2-3= 64a+45
R2 = f(4) = 2(4)3- 5(4) + a= a +108
Since R1= R2
64a +45= a+108 => 63a = 63 => a =1

Factor theorem
A binomials of the form (x + a) or (x - a) will be a factors of rational integers function f(x) if it leaves no remainder when divided by (x-a) or (x+a)

This provides a test for divisibility of an expression f(x) by (x+a).

The reminder of the number N (= n1 + n2 i.e. sum of two differnt numbers n1 and n2) when divided by a is equal to the sum of the reminders obtained when a divides n1 and n2 individually.


For Example, when we divide 47 by 5 we get reminder as 2.

Now 47 can be written as 40 + 7 and when divide 40 by 5 the reminder is 0 and when 7 is divided by 5 the remainder is 2 so some of the reminders 2 + 0 =2 is same as intial reminder.

The reminder of the number N (= n1 x n2 i.e. product of two differnt numbers n1 and n2) when divided by a is equal to the product of the reminders obtained when a divides n1 and n2 individually.

Number of a's (a prime number) in N!

Number of a’s in N! = [N/a] + [N/a2] + [N/a3] + . . . . .

Where [] shows the floor or integer function
The floor function means round down to the nearest integer.

For example how many 2’s are in 12!
Ans: It ‘s [12/2] + [12/4] + [12/8] + [12/16]
= 6 + 3 + 1 + 0 = 10

While doing the calculation do it as follows first 12/2 = 6
Second number is 6/2= 3
Third number = 3/2 =1
So you should write directly as 6 + 3 + 1

Ex2: 45! Ends with _ zeros?
Number zeros depends upon number of 5’s and 2’s.
Number of 5’s : 9 + 1 = 10
Number of 2’s : 22 + 11 + 5 + 2 + 1 = 41
So number of zero’s = 10

multiplication table 1 to 25

polygon and its properties

What is a Polygon?
A closed plane figure made up of several line segments that are joined together. The sides do not cross each other. Exactly two sides meet at every vertex.

Types | Formulas | Parts | Special Polygons | Names

Types of Polygons
Regular - all angles are equal and all sides are the same length. Regular polygons are both equiangular and equilateral.
Equiangular - all angles are equal.
Equilateral - all sides are the same length.

Convex - a straight line drawn through a convex polygon crosses at most two sides. Every interior angle is less than 180°.
Concave - you can draw at least one straight line through a concave polygon that crosses more than two sides. At least one interior angle is more than 180°.

Polygon Formulas
(N = # of sides and S = length from center to a corner)

Area of a regular polygon = (1/2) N sin(360°/N) S2

Sum of the interior angles of a polygon = (N - 2) x 180°

The number of diagonals in a polygon = 1/2 N(N-3)
The number of triangles (when you draw all the diagonals from one vertex) in a polygon = (N - 2)

Polygon Parts

Side - one of the line segments that make up the polygon.

Vertex - point where two sides meet. Two or more of these points are called vertices.

Diagonal - a line connecting two vertices that isn't a side.

Interior Angle - Angle formed by two adjacent sides inside the polygon.

Exterior Angle - Angle formed by two adjacent sides outside the polygon.

Special Polygons
Special Quadrilaterals - square, rhombus, parallelogram, rectangle, and the trapezoid.

Special Triangles - right, equilateral, isosceles, scalene, acute, obtuse.

Polygon Names
Generally accepted names

Sides
Name
n
N-gon
3
Triangle
4
Quadrilateral
5
Pentagon
6
Hexagon
7
Heptagon
8
Octagon
10
Decagon
12
Dodecagon

Names for other polygons have been proposed.

Sides
Name
9
Nonagon, Enneagon
11
Undecagon, Hendecagon
13
Tridecagon, Triskaidecagon
14
Tetradecagon, Tetrakaidecagon
15
Pentadecagon, Pentakaidecagon
16
Hexadecagon, Hexakaidecagon
17
Heptadecagon, Heptakaidecagon
18
Octadecagon, Octakaidecagon
19
Enneadecagon, Enneakaidecagon
20
Icosagon
30
Triacontagon
40
Tetracontagon
50
Pentacontagon
60
Hexacontagon
70
Heptacontagon
80
Octacontagon
90
Enneacontagon
100
Hectogon, Hecatontagon
1,000
Chiliagon
10,000
Myriagon

To construct a name, combine the prefix+suffix

Sides
Prefix
20
Icosikai...
30
Triacontakai...
40
Tetracontakai...
50
Pentacontakai...
60
Hexacontakai...
70
Heptacontakai...
80
Octacontakai...
90
Enneacontakai...
+
Sides
Suffix
+1
...henagon
+2
...digon
+3
...trigon
+4
...tetragon
+5
...pentagon
+6
...hexagon
+7
...heptagon
+8
...octagon
+9
...enneagon

Examples:
46 sided polygon - Tetracontakaihexagon

28 sided polygon - Icosikaioctagon

However, many people use the form n-gon, as in 46-gon, or 28-gon instead of these names.

please read it for shooting out your misconceptions or your mindset

CAT is tough not because of its content, but because of certain misconceptions in the students' mindset.

Here are some:

Myth 1: You must solve more than 60questions in 150 minutes.

This is absolutely misleading.

Attempting 35 to 50 questions in 150 minutes is enough for a good IIM to call you.

Myth 2: You must score equally well in all sections.

Students have been carried away by this assumption for so long. This is not true.

The truth is, you need more than 70 marks with not more than 85 attempts across any number of sections.

If you score 40 out of 50 in Quantitative Aptitude and 35 out of 40 in Data Interpretation and do not attempt a single question in English, you stand a better chance than someone who scores 25 in Quantitative Aptitude with 35 attempts, 35 in Data Interpretation and wastes time struggling to get seven or eight marks in Verbal Ability.

Have your priorities clear.

Know what IIMs or top business schools are looking for.

Here are some pointers

1. Top B-schools are looking for potential business tycoons who

  • Know where to use their strengths
  • Know how to minimise their weaknesses

No one is perfect. And a true manager will never attempt to become one in the area of his weakness.

2. The most important criteria in CAT is getting a total respectable score -- over 70 -- with an over 85 percent to 90 percent accuracy level.

3. Selectors at top B-schools are products of the Indian education system. They know how prepared students are and their comfort level in various subjects.

The criteria to get called by a B-school

Use the following criteria to get a call from top B-schools:

1. Your total score must be more than 70.

2. You must have an 85 percent plus accuracy level. There is no need to attempt over 85 questions to score 70 plus marks.

3. Maximise scores in the sections in which you are strong. Spend more time on these sections.

4. Neglect the weaker sections if you are confident about maximising your scores in the areas in which you are strong.

5. If time permits, attempt the difficult sections. Ensure over 90 percent accuracy in the same. This means getting four out of four questions correct.

The last word

CAT does not expect every aspirant to be Einstein. But it definitely hopes to get another Bill Gates!

CAT plays with the mindset of a person.

It expects a student to handle situations (both expected and unexpected) with ease and perform under pressure.

Common sense is the most important thing you need to do well in CAT.

This should be your motto: I know my basic strengths and should be capable of enjoying the two hour CAT exam.

And CAT will be yours for the taking!

formulas of area as well perimters with example

Area of a Square

If l is the side-length of a square, the area of the square is l2 or l × l.

Example:

What is the area of a square having side-length 3.4?
The area is the square of the side-length, which is 3.4 × 3.4 = 11.56.


Area of a Rectangle

The area of a rectangle is the product of its width and length.

Example:

What is the area of a rectangle having a length of 6 and a width of 2.2?
The area is the product of these two side-lengths, which is 6 × 2.2 = 13.2.


Area of a Parallelogram

The area of a parallelogram is b × h, where b is the length of the base of the parallelogram, and h is the corresponding height. To picture this, consider the parallelogram below:


We can picture "cutting off" a triangle from one side and "pasting" it onto the other side to form a rectangle with side-lengths b and h. This rectangle has area b × h.


Example:

What is the area of a parallelogram having a base of 20 and a corresponding height of 7?
The area is the product of a base and its corresponding height, which is 20 × 7 = 140.


Area of a Trapezoid


If a and b are the lengths of the two parallel bases of a trapezoid, and h is its height, the area of the trapezoid is
1/2 × h × (a + b) .

To picture this, consider two identical trapezoids, and "turn" one around and "paste" it to the other along one side as pictured below:


The figure formed is a parallelogram having an area of h × (a + b), which is twice the area of one of the trapezoids.

Example:

What is the area of a trapezoid having bases 12 and 8 and a height of 5?
Using the formula for the area of a trapezoid, we see that the area is
1/2 × 5 × (12 + 8) = 1/2 × 5 × 20 = 1/2 × 100 = 50.


Area of a Triangle

or

Consider a triangle with base length b and height h.
The area of the triangle is 1/2 × b × h.

To picture this, we could take a second triangle identical to the first, then rotate it and "paste" it to the first triangle as pictured below:

or

The figure formed is a parallelogram with base length b and height h, and has area b × ×h.
This area is twice that of the triangle, so the triangle has area 1/2 × b × h.

Example:

What is the area of the triangle below having a base of length 5.2 and a height of 4.2?
The area of a triangle is half the product of its base and height, which is 1/2 ×5.2 × 4.2 = 2.6 × 4.2 = 10.92..



Area of a Circle

The area of a circle is Pi × r2 or Pi × r × r, where r is the length of its radius. Pi is a number that is approximately 3.14159.

Example:

What is the area of a circle having a radius of 4.2 cm, to the nearest tenth of a square cm? Using an approximation of 3.14159 for Pi, and the fact that the area of a circle is Pi × r2, the area of this circle is Pi × 4.22 3.14159 × 4.22 =55.41…square cm, which is 55.4 square cm when rounded to the nearest tenth.


Perimeter

The perimeter of a polygon is the sum of the lengths of all its sides.

Example:

What is the perimeter of a rectangle having side-lengths of 3.4 cm and 8.2 cm? Since a rectangle has 4 sides, and the opposite sides of a rectangle have the same length, a rectangle has 2 sides of length 3.4 cm, and 2 sides of length 8.2 cm. The sum of the lengths of all the sides of the rectangle is 3.4 + 3.4 + 8.2 + 8.2 = 23.2 cm.

Example:

What is the perimeter of a square having side-length 74 cm? Since a square has 4 sides of equal length, the perimeter of the square is 74 + 74 + 74 + 74 = 4 × 74 = 296.

Example:

What is the perimeter of a regular hexagon having side-length 2.5 m? A hexagon is a figure having 6 sides, and since this is a regular hexagon, each side has the same length, so the perimeter of the hexagon is 2.5 + 2.5 + 2.5 + 2.5 + 2.5 + 2.5 = 6 × 2.5 = 15m.

Example:

What is the perimeter of a trapezoid having side-lengths 10 cm, 7 cm, 6 cm, and 7 cm? The perimeter is the sum 10 + 7 + 6 + 7 = 30cm.


Circumference of a Circle

The distance around a circle. It is equal to Pi () times the diameter of the circle. Pi or is a number that is approximately 3.14159.

Example:

What is the circumference of a circle having a diameter of 7.9 cm, to the nearest tenth of a cm? Using an approximation of 3.14159 for , and the fact that the circumference of a circle is times the diameter of the circle, the circumference of the circle is Pi × 7.9 3.14159 × 7.9 = 24.81…cm, which equals 24.8 cm when rounded to the nearest tenth of a cm

Books, that u can refer while preparing for cat

Oswaal Chapter-Wise Solutions of  CAT (1993 - Nov.2007) Solved Papers

Oswaal Chapter-Wise Solutions of CAT (1993 - Nov.2007) Solved Papers
by Panel of Experts

Price:

Rs. 269/-

Arihant  Quantum CAT Also Useful for XAT,GMAT,SNAP,MAT & Other Entrance Exams

Arihant Quantum CAT Also Useful for XAT,GMAT,SNAP,MAT & Other Entrance Exams
by Sarvesh Kumar Verma

Price:

Rs. 340/-

Arihant  Step By Step Chapter-Wise CAT Common Admission Test (Solved Papers 1993-2006)

Arihant Step By Step Chapter-Wise CAT Common Admission Test (Solved Papers 1993-2006)
by B.S.Sijwali & Indu Sijwali

Price:

Rs. 248/-

Upkars Common Admission Test Solved Papers

Upkars Common Admission Test Solved Papers

Price:

Rs. 56/-

Galgotia IIM Entrance Test CAT

Galgotia IIM Entrance Test CAT
by Ravi Chopra

Price:

Rs. 256/-

Ramesh MBA/CAT Ent. Exam Practice Test Papers

Ramesh MBA/CAT Ent. Exam Practice Test Papers
by Abha Sood

Price:

Rs. 104/-

Oswaal An Interview Guide For CAT & MBA

Oswaal An Interview Guide For CAT & MBA

Price:

Rs. 119/-

Wiley Dreamtech Comdex CAT All-in-One Study Kit for IIM Entrance Free Sample Test  Papers on CD

Wiley Dreamtech Comdex CAT All-in-One Study Kit for IIM Entrance Free Sample Test Papers on CD
by R. P. Chopra & S. K. Chopra

Price:

Rs. 284/-

Wiley Dreamtech Comdex CAT All-in-one Study Kit for IIM Entrance

Wiley Dreamtech Comdex CAT All-in-one Study Kit for IIM Entrance
by Prof.R.P.Chopra & Prof.S.K.Gupta

Price:

Rs. 284/-

Asians CAT, 3rd Edition 2004

Asians CAT,
by R.P. Verma & Mala Kapur

Price:

Rs. 256/-

CTP Course in Quantitative Apptitude for Competitive Examinations

CTP Course in Quantitative Apptitude for Competitive Examinations
by P.K.Agarwal

Price:

Rs. 144/-

Wiley Dreamtech Cracking the Quant

Wiley Dreamtech Cracking the Quant
by Jagdeep I. Vaishnav

Price:

Rs. 179/-

PEI Quantitative Aptitude For CAT And Other MBA Entrance Exams

PEI Quantitative Aptitude For CAT And Other MBA Entrance Exams
by Time

Price:

Rs. 292/-

W.R. Goyal GRE CAT Answers To The Real Essay Questions (2nd Edition)

W.R. Goyal GRE CAT Answers To The Real Essay Questions (2nd Edition)
by Mark Alan Stewart, J.D.

Price:

Rs. 350

W.R. Goyal Gmat Cat Answers To The Real Essay Questions (3rd Edition)

W.R. Goyal Gmat Cat Answers To The Real Essay Questions (3rd Edition)
by Mark Alan Stewart,Frederick J. O Toole & Linda Bomstad

Price:

Rs. 280/-

Oswaal 10 Mock Test Papers CAT (Common Admission Test)

Oswaal 10 Mock Test Papers CAT (Common Admission Test)
by Panel of Experts

Price:

Rs. 159/-

TMH How to Prepare For The Verbal Ability And Reading Comprehension for the CAT

TMH How to Prepare For The Verbal Ability And Reading Comprehension for the CAT
by Arun Sharma & Meenakshi Upadhyay

Price:

Rs. 332/-

TMH How To Prepare For Quantitative Aptitude for The CAT

TMH How To Prepare For Quantitative Aptitude for The CAT
by Arun Sharma

Price:

Rs. 237/-





TMH The Complete CAT Digest

TMH The Complete CAT Digest
by Arun Sharma

Price:

Rs. 470/-

TMH How To Prepare For The CAT with CD

TMH How To Prepare For The CAT with CD
by Muhamed Muneer

Price:

Rs. 332/-

Arihant Face 2 Face With CAT Topic - wise Analysis of Previous Years Question Papers 15 Years (1993-2007)

Arihant Face 2 Face With CAT Topic - wise Analysis of Previous Years Question Papers 15 Years (1993-2007)
by B S Sijwali & Indu Sijwali

Price:

Rs. 350

TMH How To Prepare For The Data Interpretation And Logical Reasoning For The CAT 3rd Edition

TMH How To Prepare For The Data Interpretation And Logical Reasoning For The CAT 3rd Edition
by Arun Sharma

Price:

Rs. 299/-

Bookhives Master Resource Book on CAT

Bookhives Master Resource Book on CAT
by Ravji S. Kaushik

Price:

Rs. 470/-