CAT 2023 Question Paper | CAT QA
CAT Question Paper | CAT Previous Year Paper

Questions 45 to 66 carry 3 marks each.

Q. 1.

A lab experiment measures the number of organism at 8 am every day. Starting with 2 organism on the first day the number of organism on any day is equals to 3 more than twice the number on the previous day if the number of organism on the n^th day exceeds one million then the lowest possible value of n is

Questions 45 to 66 carry 3 marks each.

Q. 2.

The number of all natural numbers up to 1000 with non-repeating digits is

Questions 45 to 66 carry 3 marks each.

Q. 3.

Questions 45 to 66 carry 3 marks each.

Q. 4.

In a right-angled triangle ∆ABC, the altitude AB is 5 cm, and the base BC is 12 cm. P and Q are two points on BC such that the areas of ∆ABP, ∆ABQ and ∆ABC are in arithmetic progression. If the area of ∆ABC is 1.5 times the area of ∆ABP, the length of PQ, in cm, is

Questions 45 to 66 carry 3 marks each.

Q. 5.

A quadrilateral ABCD is inscribed in a circle such that AB : CD = 2 : 1 and BC : AD = 5 : 4. If AC and BD intersect at the point E, then AE : CE equals

Questions 45 to 66 carry 3 marks each.

Q. 6.

Let C be circle x² +y² + 4x ‒ 6y ‒ 3 =0 and L be the locus of the point of intersection of a pair of tangents to C with the angle between the two tangents equals to 60°. Then the point at which touches the line x = 6 is

Questions 45 to 66 carry 3 marks each.

Q. 7.

Arvind travels from town A to town B, and Surbhi from town B to town A, both starting at the same time along the same route. After meeting each other, Arvind takes 6 hours to reach town B while Surbhi takes 24 hours to reach town A. If Arvind travelled at a speed of 54 km/h, then the distance, in km, between town A and town B is

Questions 45 to 66 carry 3 marks each.

Q. 8.

The amount of job that Amal, Sunil and Kamal can individually do in a day, are in harmonic progression. Kamal takes twice as much time as Amal to do the same amount of job. If Amal and Sunil work for 4 days and 9 days, respectively, Kamal needs to work for 16 days to finish the remaining job. Then the number of days Sunil will take to finish the job working alone, is

Questions 45 to 66 carry 3 marks each.

Q. 9.

Anil invests Rs. 22000 for 6 years in a certain scheme with 4% interest per annum, compounded half-yearly. Sunil invests in the same scheme for 5 years, and then reinvests the entire amount received at the end of 5 years for one year at 10% simple interest. If the amounts received by both at the end of 6 years are same, then the initial investment made by Sunil, in rupees, is

Questions 45 to 66 carry 3 marks each.

Q. 10.

The minor angle between the hours hand minutes hand of a clock was observed at 8.48 am the minimum duration in minutes after 8.48 am when this angle increases by 50% is

Questions 45 to 66 carry 3 marks each.

Q. 11.

In an examination, the average marks of 4 girls and 6 boys is 24. Each of the girls has the same marks while each of the boys has the same marks. If the marks of any girl is at most double the marks of any boy, but not less than the marks of any boy, then the number of possible distinct integer values of the total marks of 2 girls and 6 boys is

Questions 45 to 66 carry 3 marks each.

Q. 12.

A mixture P is formed by removing a certain amount of coffee from a coffee jar and replacing the same amount with cocoa powder. The same amount is again removed from mixture P and replaced with same amount of cocoa powder to form a new mixture Q. If the ratio of coffee and cocoa in the mixture Q is 16 : 9, then the ratio of cocoa in mixture P to that in mixture Q is 

Questions 45 to 66 carry 3 marks each.

Q. 13.

The salaries of three friends Sita, Gita and Mita are initially in the ratio 5 : 6 : 7, respectively. In the first year, they get salary hikes of 20%, 25% and 20%, respectively. In the second year, Sita and Mita get salary hikes of 40% and 25%, respectively, and the salary of Gita becomes equal to the mean salary of the three friends. The salary hike of Gita in the second year is 

Questions 45 to 66 carry 3 marks each.

Q. 14.

Gita sells two objects A and B at the same price such that she makes a profit of 20% on object A and a loss of 10% on object B. If she increases the selling price such that objects A and B are still sold at an equal price and a profit of 10% is made on object B, then the profit made on object A will be nearest to 

Questions 45 to 66 carry 3 marks each.

Q. 15.

Brishti went on an 8 hour trip in a car before the trip the car had travelled a total of x km till then where x is a whole number and is palindromic, ie x remains unchanged when its digits are reversed. At the end of the trip the car had travelled a total of 26862 km till then , this number again being palindromic if brishti never drove at more than 110km/h then the greatest possible average speed at which she drove during the trip in km/h was

Questions 45 to 66 carry 3 marks each.

Q. 16.

The equation x³ + (2r + 1) x² + (4r ‒ 1)x + 2 = 0 has ‒2 as one of the roots. If the other two roots are real then the minimum possible non negative integer value of r is

Questions 45 to 66 carry 3 marks each.

Q. 17.

Let a and β be the two distinct roots of the equation 2x² â€’ 6x + k = 0 such that (a + β)and aβ are the distinct roots of equation x² + px + p = 0 then the value of 8 (k ‒ p) is.

Questions 45 to 66 carry 3 marks each.

Q. 18.

The number of integer solution of equation 2|x| (x² + 1)= 5x² is

Questions 45 to 66 carry 3 marks each.

Q. 19.

If x and y are positive real number such that log _x (x² +12) = 4 and 3 log _y x = 1, then x + y equals 

Questions 45 to 66 carry 3 marks each.

Q. 20.

Questions 45 to 66 carry 3 marks each.

Q. 21.

Let π be the least positive integer such that 168 is a factor 1134°. If m is the least positive integer such that 1134ⁿ is a factor 168^m, them m + n equals 

Questions 45 to 66 carry 3 marks each.

Q. 22.

If x and y are real numbers such that x² + (x ‒ 2y ‒1) ² = ‒ 4y (x+y), then the value x ‒ 2y is