CAT 2002 Question Paper

First counting only nos. 1,2 and 3.

So, we have 6 mangoes, 6 oranges and 7 apples.

We have 4 times 4 so finally we have 2 mangoes, 2 oranges and 7 apples, which is a total of 11 fruits.

On counting only numbers 1,2 and 3, we have 6 mangoes, 6 oranges and 7 apples.

We have 4 times number 4 => Finally we have 2 mangoes , 2 oranges and 7 apples. So, a total of 11 fruits.

The number of ways in which this can be done is 11*10*9*8 = 7920

If there are 3 symmetric letters, it can be formed in 11*10*9 ways

If there are 2 symmetric letters, it can be formed in 11C2 * 15C1 * 3! ways

If there is only 1 symmetric letter, the password can be formed in 15C2*11C1*3! ways

Total = 990+330*15+630*11 = 12870 ways

The length of FI is twice the length of IG.

So, the sides of the triangle FIG are in the ratio 2:1:$$\sqrt5$$.

So, angle FGO = angle FGI, which is definitely not equal to 30 or 45 or 60.

Hence, option D is the answer.

Area of ABCD = Area of triangle + Area of rectangle = Let AB = x. So, area = $$3/2 * x^2 / 2 = 3/4 * x^2$$
Area of ODE = $$\frac{1}{2}* \frac{x}{2}*\frac{x}{2}$$=$$x^2/8$$
Area of OEFI = $$ \frac{x}{2}*\frac{x}{2}$$=$$x^2/4$$
Area of FGI = $$x^2/16$$
Total area of DEFG = $$7x^2/16$$
Required ratio = 12:7

According to given condiitons, number of 1 digit nos. = 2, number of 2 digit nos. = 2*3 , number of 3 digit nos. = $$2*3^2$$ , number of 4 digit nos. = $$2*3^3$$ , number of 5 digit numbers. = $$2*3^4$$,  Number of 6 digit nos. = $$2 *3^5$$.

Total summation 2*(1+3+9+27+81+243) = 728 . 

For any selection of three numbers, there is only one way in which they can be arranged in ascending order.

So, the answer is $$^{10}C_3 = 120$$

By using cosine rule we can find BC = $$\sqrt{13}$$ . By angle bisector theorem we have BA / BD = AC / DC . Also BD + DC = $$\sqrt{13}$$. So by substitution we get we get BD = 4*$$\sqrt{13}$$/7 . Now using cosine rule in triangle ABD taking AD = x, we get

$$x^2 - 4*\sqrt3*x + 16*(36/49) = 0$$. Solving the equation we get x = $$\frac{12\sqrt 3}{7}$$ .

The radii of both the circles and the line joining the centers of the two circles form a right angled triangle. So, the length of the common chord is twice the length of the altitude dropped from the vertex to the hypotenuse.

Let the altitude be h and let it divide the hypotenuse in two parts of length x and 25-x
So, $$h^2 + x^2 = 15^2$$ and $$h^2 + (25-x)^2 = 20^2$$
=> $$225 - x^2 = 400 - x^2 + 50x - 625$$
=> 50x = 450 => x = 9 and h = 12
So, the length of the common chord is 24 cm.