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Board Paper of Class 12-Commerce Term-II 2022 Math Delhi(Set 2) - Solutions

General Instructions:
Read the following instructions very carefully and strictly follow them:
1. This question paper contains three Sections - A, B and C.
2. Each section is compulsory.
3. Section - A has 6 short-answer type-I questions of 2 marks each.
4. Section - B has 4 short answer type-II questions of 3 marks each.
5. Section - C has 4 long-answer type questions of 4 marks each.
6. There is an internal choice in some questions.
7. Question 14 is a case study based question with two subparts of 2 marks each.

  • Question 1
    Find the vector equation of a line passing through a point with position vector 2i^-j^+k^ and parallel to the line joining the points -i^+4j^+k^ and i^+2j^+2k^. VIEW SOLUTION

  • Question 3
    Find the general solution of the following differential equation:
    dydx=ex-y+x2e-y VIEW SOLUTION

  • Question 4
    Events A and B are such that 
    PA=12, PB=712 and PA¯B¯=14
    Find whether the events A and B are independent or not.


    A box B1 contains 1 white ball and 3 red balls. Another box B2 contains 2 white balls and 3 red balls. If one ball is drawn at random from each of the boxes B1 and B2, then find the probability that the two balls drawn are of the same colour. VIEW SOLUTION

  • Question 5
    Let X be a random variable which assumes values x1, x2, x3, x4 such that 2P(X = x1) = 3P(X = x2) = P(X = x3) = 5P(X = x4).
    Find the probability distribution of X. VIEW SOLUTION

  • Question 6
    If a=i^+j^+k^, a.b=1 and a×b=j^k^, then find b VIEW SOLUTION

  • Question 7
    ex.sin2x dx


    2xx2+1x2+2dx VIEW SOLUTION

  • Question 8
    Find the equation of the plane passing through the line of intersection of the planes r.i^+j^+k^=10 and r.2i^+3j^-k^+4=0  and passing through the point (–2, 3, 1). VIEW SOLUTION

  • Question 9
    Let a=i^+j^,  b=i^-j^ and c=i^+j^+k^. If  n^ is a unit vector such that a·n^=0 and b·n^=0, then find c·n^.


    If a and b are unit vectors inclined at an angle 30° to each other, then find the area of the parallelogram with a+3b and 3a +b as adjacent sides. VIEW SOLUTION

  • Question 11
    Solve the following differential equation :
    (y – sin2x)dx + tanx dy = 0


    Find the general solution of the differential equation:
    (x3 + y3)dy = x2ydx VIEW SOLUTION

  • Question 12
    Find the area bounded by the curves y = |– 1| and y = 1, using integration. VIEW SOLUTION

  • Question 13
    In a factory, machine A produces 30% of total output, machine B produces 25% and the machine C produces the remaining output. The defective items produced by machines A, B and C are 1%, 1.2%, 2% respectively. An item is picked at random from a day's output and found to be defective. Find the probability that it was produced by machine B. VIEW SOLUTION

  • Question 14
    Two motorcycles A and B are running at the speed more than the allowed speed on the roads represented by the lines r=λi^+2j^-k^  and  r=3i^+3j^+µ2i^+j^+k^ respectively.

    Based on the above information, answer the following questions:
    (a) Find the shortest distance between the given lines.
    (b) Find the point at which the motorcycles may collide. VIEW SOLUTION
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