Solved question paper for Mathematics Mar-2018 (UBSE 12th)

MATHEMATICS

Previous year question paper with solutions for MATHEMATICS Mar-2018

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Question paper 1

1. (a) if then value of -

(i)

0

(ii)

2

(iii)

6

(iv)

8

Answer:
(b) The principal value of is :

(i)

(ii)

(iii)

(iv)

Answer:

(iv)
(c) If then value of will be.

(i)

0

(ii)

1

(iii)

-1

(iv)

Answer:

(ii)

1
(d) The slope of the tangent to the curve at is :

(i)

6

(ii)

10

(iii)

1

(iv)

12

Answer:

(iii)

1
(e) The order of differential equation

(i)

0

(ii)

1

(iii)

2

(iv)

3

Answer:

(iii)

2
(f) Direction ratios of the line joining points A (2,3,-4) and (1,-5,3)is:

(i)

1,5,7

(ii)

-1,-5,-7

(iii)

1,-5-7

(iv)

-1,-5,7

Answer:

(iv)

-1,-5,7
2. If and are given by and then find g of.

Answer:
3. Integrate the given function with respect to x:

Answer:
4. Find the value of if the vectors and

Answer:
5. Determine the direction-cosines of a line making equal angles with the co-ordinate axes.

Answer:
Dir.-cosines of a line making with x-axis, with y-axis & with z-axis are l,m,n

Dir.-cosines are:

We know:
6. Find the values of x for which

Answer:
7. Find , if x=at² , y=2at

Answer:
8. Differentiate a w.e.t.x where ‘a’ is positive constant.

Answer:
9. Find the interval in which the function f given by is strictly increasing

Answer:

For str. Inc.;

In ; is st. inc.
10.Evaluate : \

Answer:
11.Find the general solution of the differential equation

Answer:

Integrating
Or

Find the particular solution of the differential equation given that y= 1, when x=0.

Answer:

Integrating

Putting x=0 & y=1 in

Soln. is
12. Find the unit vector perpendicular to each of the vectors and

Answer:
The vector to both =

Now, unit vector in the direc.
Or

Find the area of a parallelogram whose adjacent sides are given by the vectors and

Answer:

&

Area of parallelogram

Area of parallelogram
13. Find the vector equation for the line passing through the point (-1,0,2)and (3,4,6).

Answer:
A(-1,0,2)and B(3,4,6).

vector equation for the line passing through the point with position vectors is:
14. Consider the function given by . Prave that f is one onto. Find also function of f.

Answer:
15. Prove that

Answer:
16. Find the inverse of matrix by using elementary operation.

Answer:
Or

Evaluate the determinant:

Answer:
17.Examine the function for its continuity at point x=2

Answer:

is not cont. at ‘2’
18. Integrate the function with respect to x

Answer:
19. Prove that

Answer:
L.S.H=I=0π4log1+tanx dx ①

Property: 0afxdx=0afa-xdx
Or

Find

Answer:
20. If two vectors are such that the find

Answer:
21.From a pack of 52 playing cards , two cards are draw at random without replacement. Find the Probability of being both cards black.

Answer:
Let

: 1st card drawn is black .

: 2nd card drawn is black.
Or

Prove that if E and F are two independent events, then E and F are also independent

Answer:
E and F are two indep.

E and F’ are two independent
22. If , then verify that Also find

Answer:
23. Find the area laying above x-axis and included between the circle and inside of the parabola

Answer:

intersection pt.

intersection pt. of
Or

Find the area enclosed by the ellipse

Answer:

Since ellipse is symmetrical both x-axis & y-axis

Area enclosed by

Put in ;
24. Prove that the rectangle of maximum area , inscribed in a circle, is a square.

Answer:
Let the length and breadth of the rectangle inscribed in a circle of radius

a be x & y resp.

Diff. w.r.t.x;

Diff. w.r.t.x;

For to be minimum;

:. is max. at x=2a

Thus

:. The rectangle is a

square if side
Or

Prove that the radius of the right circular cylinder of greatest surface area which can be inscribed in a given cone is half of that of the cone

Answer:
let OC=r be radius of cone

& OA=h, height of cone

&

Let OE =x be radius of cylinder =OO’

From

Now curved surface area of cylinder

Diff. w.r.t.x;

Now

Hence, radius of cylinder with greatest curved surface area which can be inscribed in a given cone is half of that cone
25. Solve the differential equation

Answer:

Integration,

Ans.
26. Find the vector and Cartesian equation of a line passing through the point (1,2,3) and parallel to the vector

Answer:
27. A bag contains 3 black and 4 red balls. Two balls are drawn at random one at a time. Without replacement. Find the probability that the first ball is black if the second ball is known to be red.

Answer:
Black3

Red4

Let event

B: drawn ball is black

R: drawn ball is red

To find : P(BR)

Since

Now to find

Put in
Or

From a pack of 52 well-shuffled playing cards. Two cards are drawn at a time find the probability distribution of the kings

Answer:
Let X be the number of king obtained

Hence x={x can be 0,1or 2
28. solve the following linear programming problem graphically:

Maximize

Subject to the given constraints:

Answer:

     s/t

Plotting

x

0

10

y

5

0

Plotting

x

0

5

y

-15

0

(0,0) satisfies (B)

     : Shade the region left to

     : OABC is the reqd. region

Intersection point of :



















Point

O(0,0)

A(0,5)

B

C(5,0)   Z=15

: B    is optimal pt.

& optimal soln. is :