Course Code | BCS-012 |
Course Title | Basic Mathematics |
Assignment Number | BCA(1)012/Assignment/2019-20 |
Maximum Marks | 100 |
Weightage | 25% |
Last Date of Submission | 15th October 2019 (For July 2019 Session) |
15th April 2020 (For January 2020 Session) |
Answer all the questions in the assignment which carry 80 marks in total. All the questions are of equal marks. Rest 20 marks are for viva voce. You may use illustrations and diagrams to enhance the explanations. Please go through the guidelines regarding assignments given in the Programme Guide for the format of the presentation. Make suitable assumption if necessary
Q1.
Show that
1Β πΒ π2
πΒ π2Β 1 = 0
π2Β 1Β Β 0
Where π is a complex cube root of unity.
Q2.
If A =3 -1
2 1
Show that A2 – 4 A + 5 I2 = 0. Also, find A4.
Q3.
Show that 133 divides 11n+2 + 122n+1 for every natural number n.
Q4.
If the term of an A.P is q and the term of the A.P. is p, find its rth term.
Q5.
If 1, π, π2 are cube roots of unity, show that (2 β π) (2 β π2) (2 β π19) (2 β π23) = 49.
Q6.
If Ξ±, Ξ² are roots of x2 β 3ax + a2 = 0, find the value(s) of a if Ξ±2 + Ξ²2 = 74 .
Q7.
If y=πΌπ β1+X β β1βXβ1+X + β1βX, find dydX .
Q8.
If A=2 -1 0
1 0 3.
3 0 -1
, show that A (adj.A) = |A |I3
Q9.
Find the sum of all the integers between 100 and 1000 that are divisible by 9
Q10.
Write De Moivreβs theorem and use it to find (β3+ i)3.
Q11.
Solve the equation x3 β 13×2 + 15x + 189 = 0,Given that one of the roots exceeds the other by 2.
Q12.
Solve the inequality 2Xβ1 > 5 and graph its solution.
Q13.
Determine the values of x for which f(x) = x4 β 8×3 + 22×2 β 24x + 21 is increasing and for which it is decreasing.
Q14.
Find the points of local maxima and local minima of
f(x) = x3β6×2+9x+2014, x Ξ΅ π.
Q15.
Evaluate : β«dx(exβ1)2
Q16.
Using integration, find length of the curve y = 3 β x from (-1, 4) to (3, 0).
Q17.
Find the sum up to n terms of the series 0.4 + 0.44 + 0.444 + β¦
Q18.
Show that the lines X β 54 = y β 7β4 = z β3β5 and Xβ84 = y β 4β4 = z β 54 Intersect.
Q19.
A tailor needs at least 40 large buttons and 60 small buttons. In the market, buttons 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 the cost of a card is $ 2, find how many boxes and cards should be purchased to minimize the expenditure.
Q20.
A manufacturer makes two types of furniture, chairs, and tables. Both the products are processed on three machines A1, A2, and A3. Machine A1 requires 3 hours for a chair and 3 hours for a table, machine A2 requires 5 hours for a chair and 2 hours for a table and machine A3 requires 2 hours for a chair and 6 hours for a table. The maximum time available on machines A1, A2 and A3 are 36 hours, 50 hours and 60 hours respectively. Profits are $ 20 per chair and $ 30 per table. Formulate the above as a linear programming problem to maximize the profit and solve it.