The LNM Institute of Information Technology Jaipur, Rajasthan MATHEMATICS-I
End Term Exam (Part-1)
November 18, 2015 Time: 50 minutes, Maximum Marks: 30
Series: B
Name:
Roll No.:
Note: Each question carry 3 marks for correct answer and carry a negative marking of 1 mark for wrong answer. Some of the questions have four alternative answers (A, B, C, D) out of which one or more options may be correct. Encircle/Tick the correct answer(s). Any Overwriting will be treated as a wrong answer and negative marks will be awarded accordingly. Do not write anything here except the answer.
1. Let f : [0, 1] → R be a continuous function. Let P = the partitions of [0, 1]. Then (A L(P, f ) ≤ L(Q, f ) ≤ U (Q, f ) ≤ U (P, f ), (C) L(Q, f ) ≤ L(P, f ) and U (Q, f ) ≤ U (P, f ),
0,
1 2 , ,··· ,1 10 10
and Q =
1 2 0, , , · · · , 1 be 100 100
(B) L(Q, f ) ≤ L(P, f ) ≤ U (P, f ) ≤ U (Q, f ), (D) None of above.
1
2. The function f (x) = e− |x| for x 6= 0 and f (0) = 0 is concave up in m open intervals and concave down in n open intervals. Then (m, n) equals. (A) (0, 1), (B) (1, 0), (C) (1, 2), (D) (2, 1). 3. Consider the sequence an = (A) 198,
4. The sequence an =
n X
n . The minimum n0 such that |an − 1| < n+2 (B) 199, (C) 200,
1 100
for n ≥ n0 , is (D) 201.
(−1)k is
k=1
(A) bounded but not convergent, (C) convergent but not bounded,
(B) both bounded and convergent, (D) neither bounded nor convergent.
5. Given ǫ > 0, the ( largest δ which fits the definition of continuity of the function x+3 if x ≤ 1 2 f (x) = 7−x at x = 1 is if 1 ≤ x 3 (A) ǫ/2, (B) ǫ/3, (C) 2ǫ,
(D) 3ǫ.
→ 6. Parametric equations of the line through P (−1, 4, 2) and in the direction of − v = (1, 2, 3) is: 7. The curve r = 2 cos θ, 0 ≤ θ ≤ π represents a (A) circle, (B) cardioid,
(C) lemniscate,
.
(D) ray.
8. Let f be a scalar field defined on R2 and suppose directional derivatives of f exist for all directions. Then f is continuous. TRUE or FALSE . R
x − y ds, where C is the line segment from (1, 3) to (5, −2) is:
+y 2 )
dA, where D is the region between the two circles x2 + y 2 = 1 and
9. The value of the line integral . 10. The double integral x2 + y 2 = 4 equals: (A) π(e−1 − e−3 ),
Z Z
e−(x
2
C
D
(B) π(e−1 − e−4 ),
(C) π(e−2 − e−3 ),
(D) π(e−2 − e−4 ).