Ques 1.

If A = 3 -1 ,
          2 1
Show that A2
- 4 A + 5 I2 = 0. Also, find A4
.

Ques 2.

Find the sum of first all integers between 100 and 1000 which are divisible by 7.

Ques 3.

a) If pth term of an A.P is q and qth term of the A.P. is p, find its rth term.

b) Find the sum of all the integers between 100 and 1000 that are divisible by 9.

Ques 4.

If 1,

Ques 5.

If α, β are roots of x2 – 3ax + a2 = 0, find the value(s) of a if α2 + β2 = 7 4 .

Ques 6.

If y =

Ques 7.

Evaluate : ∫x ²√5x − 3dx

Ques 8.

Use De Moivre’s theorem to find (√3 + i) ³

Ques 9.

Solve the equation x ³ – 13x ² + 15x + 189 = 0, Given that one of the roots exceeds the other by 2.

Ques 10.

Solve the inequality 2 X−1 > 5 and graph its solution.

Ques 11.

Determine the values of x for which f(x) = x ⁴ – 8x ³ + 22x ² – 24x + 21 is increasing and for which it is decreasing.

Ques 12.

Find the points of local maxima and local minima of f(x) = x 3 – 6 x 2 + 9x + 2014, x ε

Ques 13.

Using integration, find length of the curve y = 3 – x from (-1, 4) to (3, 0)

Ques 14.

Show that the lines, given below, Intersect each other.

Ques 15.

A tailor needs at lease 40 large buttons and 60 small buttons. In the market, buttions are available in two boxes or cards. A box contains 6 large and 2 small buttons and a card contains 2 large and 4 small buttons. If the cost of a box is $3 and cost of a card is $2, find how many boxes and cards should be purchased so as to minimize the expenditure.

Ques 16.

Find the scalar component of projection of the vector a = 2

Ques 17.

If 

Show that Also, find 

Ques 18.

Find the sum of first all integers between 100 and 1000 which are divisible by 7.

Ques 19.

If  term of an A.P is q and  term of the A.P. is p, find its  term.

 Find the sum of all the integers between 100 and 1000 that are divisibleby 9.

Ques 20.

. Find the sum of first all integers between 100 and 1000 which are divisible by 7.

Ques 21.

If , are cube roots of unity, show that