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ECON1003 Quantitative methods in economics
创建日期:2024-05-24 17:20:09
所属分类:经济Economics
标签: ECON1003
Quantitative methods in economics

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ECON1003 

Quantitative methods in economics
Practice Mid-semester exam (Note that the objective of this exam is to get you used to
the format of the exam. Note the questions on the midterm can and will be more
difficult than the practice exam)

Instructions:

Your exam consists of 20 selective questions including Multiple choice, True/False, Fill in the
blanks and Numerical. Each question is worth 1 mark.
Permitted materials: Non-programmable calculators


1. Find t to solve 1750753 03.0 =te
a. t = 28.11
b. t = 30.25
c. t = 6.883
d. t = 6.2133
e. t = -3.4510

2. ln(22)+ln(2) is equal to
a. ln(24)
ECON1003 Practice Mid-term exam Page 2 of 7
b. ln(44)
c. ln(20)
d. 0
e. ln(11)

3. The spread of a carrot fly through an untreated crop is modelled by the equation
)1(500 5.0 teY −−= , where Y is the weight of infected carrots in tons, t is time in days.
Calculate the time taken to infect 200 tons of carrots.
a. 1.0217 days
b. 2.4792 days
c. 1.8326 days
d. 2.3491 days
e. 3.4491 days

4. Find x to solve 0562 =++ xx
a. x=1
b. x = 8 or -10
c. x = 14
d. x= -1 or -5
e. x = 2 or 10

5. The supply equation is Ps = Q2 + 6Q + 9 and demand is given by Pd = Q2 – 10Q + 25.
What is the market equilibrium?
a. Q = 1; P = 16
b. Q = 16; P = 1
c. Q = 8; P = 106
d. Q = 1; P = 18
e. Q = 1; P = 25
ECON1003 Practice Mid-term exam Page 3 of 7

6. If demand is given by P = 100 – Q, what is TR and MR for a monopolist?
a. TR = 100Q – Q2; MR = 0
b. TR = 100 – Q2; MR = 2Q
c. TR = 100Q – Q; MR = - 1
d. TR = 100Q – 2Q2; MR = 100 – 4Q
e. TR = 100Q – Q2; MR = 100 – 2Q

7. A consumer can buy good 1 or good 2 at prices p1 and p2. The quantity of good 1
purchased is x1 and the quantity of good 2 that the consumer buys is x2. What is the
consumer’s budget line and budget set (the budget set is all the bundles that the consumer can
afford to buy) with income M?
a. x1.p1 = M; x2.p2 ≤ M
b. x1.p2 +x2.p1 = M; x1.p2 +x2.p1 ≤ M
c. x1.p1 +x2.p2 < M; x1.p1 +x2.p2 = M
d. x1.p1 +x2.p2 = M; x1.p1 +x2.p2 > M
e. x1.p1 +x2.p2 = M; x1.p1 +x2.p2 ≤ M

8. What is the price elasticity of demand at q = 20 when the demand equation is P = 50 – 2q?
a. e = -0.25
b. e = -1
c. e = -1.5
d. e = -2
e. e = -4

9. A consumer can buy two goods, good 1 and 2 for prices $5 and $10 respectively. The
consumer is currently buying 6 units of good 2 and is spending $100. What range of
quantities of good 1 (q1) can the consumer buy that ensures they are in their budget set (that
is, buying a set of goods that is affordable)?
ECON1003 Practice Mid-term exam Page 4 of 7
a. q1 ≤ 8
b. q1 ≤ 4
c. q1 ≤ 16
d. q1 ≤ 10
e. q1 ≤ 5

10. Solve ex+5 = 1.56
a. x = 1.34
b. x = -2.713
c. x = -4.5553
d. x = 22.22
e. x = - 1.728

11. Solve 38 + 12e-0.5t = 208
a. t = -6.4012
b. t = 4.5
c. t = 0
d. t = -5.3018
e. None of the above

12. Differentiate
2 ln( ) 1x x
y
x
+
=
a.
2
2 1
x x

b. ln( ) 2/ 1x x+ +
c. ln( ) 2 /x x+
d. 2ln( ) 2x +
ECON1003 Practice Mid-term exam Page 5 of 7
e. None of the above


13. Solve for x: x2 – 25 = 0
a. x = ±5
b. x = 5
c. x = 0
d. x = - 5
e. None of the above

14. Differentiate 5
3
20
xP xe −=
a. 5
3
20
xxe −
b. 5
3
(1 )
20
xe x− +
c.
3
1
20
xxe +
d.
3
( 5)
20
xxe x−
e. None of the above

15. Find Q to solve QQ 812 2 −=−
a. Q = 6
b. Q = 6 or 2
c. Q = 2.32
d. Q = -2 or 6
e. Q = 2 or 8
ECON1003 Practice Mid-term exam Page 6 of 7

16. Solve: 0.2( 5)x dx− :
a. 1.2
1
( 5)
1.2
x c− +
b. 22( 5)x c− +
c. 1.2( 5)x c−− +
d. 1.2( 5)x c− +
e. None of the above.

17. Consider a consumer with income M=100 who can consume two goods. The price of the
first good is 1 per unit and the price of the second good is 2 per unit. Suppose that the
consumer spends all of her income on good 1. Then she consumes …… units of good 1.

18. Consider a consumer with income M=100 who can consume two goods. The price of the
first good is 1 per unit and the price of the second good is 2 per unit. Suppose that the
consumer spends all of her income on good 2. Then she consumes …… units of good 2.

19. Answer True or False. The derivative of a linear function is a constant.

20. Answer True or False. Every maximization problem always has a solution.

21. Answer True or False. Consider the function () = −3 + 92 − 24 + 26 defined on
the constraint set = (−∞,∞). Then x=2 is a local minimizer.

22. Answer True or False. Consider the function () = −3 + 92 − 24 + 26 defined on
the constraint set = (−∞,∞). Then x=6 is a local maximizer.

23. Answer True or False. The indefinite integral of a linear function () = where > 0
is a constant.
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MOEC0021 STA 106 ENGG 1300A ENGG 1300 OLET1139 STAT 3503 STAT 206 FEM11149 ELEN 4720 COMP20003 SOLA1070 CS574 C11CS LINB29H3 MAST90083 ECON7200 STAT 610 LINB29 DSM-5 COMP3161 EEEN40010 MATH 4431 K353 STA 3386 IERG4300 COMS W4167 ENG5298 AMME 2302 CS3910 COMPSCI 320 STATS 369 GR5242 COSC 328 CSCI435 MGTS1301 INFS2200 COMP3900 CIS 375 Module AE03 COMP3121 CS260 HAM503 MGMT5050 INT3075 COSC 285 GEOL0029 GEGE2X01 STAT1201 MATH1061 MMF1941H STAT 5060 CS 520 COMP 4320 MSIN0104 000T FINS3648 ECMT2160 ECON4003 Phys 129L CSE 142 CS 3130 MGEB01 EECS 340 Finance (20443/20444) ECMM149 COMP5310 EEEN60180 CSC 111 AT2 CSCI 4430 STAB57 MA/CSC 427 MATH322 D100 CSCI544 CITS3004 CI6227 CSE 565 APCO 1P01 852L1 ELEC S411F COMP3207 STATS330 ECON7530 FIT5149 CSI4104 CMPT 371 COMP201 SEHS4696 FI4003 MATH6182 CG1 WS MATH401 MGT 205 QTM 110 COMP 0137 MACE12201 FIT5210 ECE 544 BISM7206 HUDM 6055 ECON3203 STATS 210 MSCI 570 MATH6173 COMPSCI4039 Accounting COM3503 AOE2024 ECON213 PSYC10004 Control Data 100/200A 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