ZXTape! 0Created with Ramsoft MakeTZX J J L "" 7:7 0,0;""; ( 1:""  @rw> 0C8rH-0$l2ܜ2zFc imCֶs,8 4K]~MhtltUҹaq aqs_MgMx-N!AgY]A˔#Y&:F!w=;pi·/wd)aE ^~`.wrABB+cj'1> (1BCI$'w$VfMx#~dݷk. PdD NlMO~tLkkrlz3%uD"Tw MuOs!rK".QBſ;#L%yNJJs̶~$D"Z?>&`g ٷJ J~-b؁KoZ&5uBrWbfDŽ]LJ;QVu5q" Ah}54 fZC^]aq[dZZe|9].sLE(3ˮ- mok:j:6s A`$Zs*s3ˍ^1$6җVJISBiR禢hf^b=+pK$w}0 `860~߆4? JE@q9Y]tv{ `4|j.@eef c,ҵ.RnE8C6g,7hm}cZ5R:$JXD"kwkkFwˎCX߅Ż*@c((, mZB@Q%pA?Z17.IOK38f@" L&%ٙE 2yfߓ2>6XiLc f88@88888bNzi hkCn6U鄛^~,pH.hz}bk:"@"bz1sFf'Zx@D@+=&`a 3Ȩ[&80^-}o*>M]')ū3]!LZV}]U+y^6RKY p 0@B< Gwj1(ŭ.QMkPaS1Y 8p=."/&# 9)bxFo|EjtYM^ H 8>B4,FxBzO<e43nKْ# 6<<< dsbH+o7"bAһϠc(5/#pեcfϯFj 8/J^\ :&}Qx +h) %YJĝorDRvˑO)3E63Zat1"?dGj:2!]OL.J_G(׹הdf[RׅAZS׫XM23613=\,82R:a(25):6:1:0 iaa=0:1: n7:a=015 sa>10 160 x10 -a,0;""; 10 -a,31;""; 11 +a,0;""; 11 +a,31;""; 0,16+a;""; 0,15-a;""; 21,15-a;""; 21,16+a;""; a 0,0;""; 0,31;""; 21,0;""; 21,31;""; 6:0 41,1;" Maths Test. ";  1:7 $b$(30):a$(6,25) ,3,2;"Maths Test is a set of"; "/4,2;"multiple choice questions"; ,.5,2;"designed to exercise the"; 626,2;"student in preparation for O"; @07,2;"level G.C.E. examinations."; J+8,2;"The questions will be"; T,9 ,2;"presented continuously"; ^-10 ,2;"until you press '0' in"; h011 ,2;"reply to a question; when"; r012 ,2;"your score will be put on"; |"13 ,2;"the screen."; $18,9 ;"< GOOD LUCK >"; 'a=37:"p"+a,68D:a "p"+0,0 "p"+1,1 "p"+2,254 c=:c=0399 nq=0:ca=0 q=(*100d)+1 a=125 a(a)=q410 a:aa=25aa=0 aa=aa+1:a(aa)=q 990+q*10 :q$ a=15:a$(a) a:a=220 a,1;b$;:a an k=4:830> a=15 a+11 ,1;a;". ";  a$(a);:a 6:1:1 520,1;" Enter your answer now. "; c= !23613=\,82R &c<480540 0c>535540 :c=480700 D#0.05|L,24:c=c-480 Nc=an640 b519,1;" That is not correct. "; l920,1;" The correct answer was: ";an;" "; v 660 ca=ca+1 520,1;" That is the correct answer. "; nq=nq+1 a=11000:a 7:1:0 20,1;b$; 19,1;b$;  410 1:7:0 "ca=0c=0:710 "nq=0c=0:710 c=(ca/nq*100d) a=220 a,1;b$;:a 6:1:0 .18,7;" Your score is: ";c;"% "; 19,1;b$; 520,1;" Do you want more questions? "; c= 23613=\,82R  c=89Y670 c=121y670  c=78N *c=110n 4 770 >q$<31910 C23613=\,82R Ha=301-1 Rq$(a)=" "870f \a fe$=q$(1a-1) pk,1;e$ zq$=q$(a+1̱q$) k=k+1:830> k,1;q$:  0 ="Correct to two significant figures, the number 14.871 is;" "14"  "14.87" "14.9" "14.8" "15"  5 >"Write the number 15.264 correct to two places of decimals." "15"  "15.26"  "15.27" "16"  "15.20"  2 ="Write the number 0.164 correct to one significant figure." "0.1" "0.16" "0.2" "0.0" "2.0"  3 ?"Write the number 2846 correct to three significant figures." "2840" "2845"  "2850"  "2900"  "2847"  3 <"Correct to two places of decimals, the number 12.847 is;" "12.8"  "12.84"  "12.85" "13" "12"  3 X"If each number is given to one significant figure, what is the maximum value of 7+5?" "11" "12" "12.5" "13" "11.5"  4 $Y"If each number is given to one significant figure, what is the smallest value of 7-5?" %"1" &"2" '"2.5" ("3" )"1.5" * 1 .`"If each number is given correct to one decimal place, what is the maximum value of 10.3-6.1?" /"4.1" 0"4.2" 1"4.3" 2"4.4" 3"4.5" 4 3 8"1/10 + 2/100 equals;" 9 "0.123" : "0.213" ;"0.24" <"0.42" ="0.6" > 4 B"3/10 + 8/100 equals;" C"0.22" D"0.5" E"0.77" F"0.83" G"-0.5" H 1 L"0.12 ^ 2 equals;" M "0.0144" N "0.144" O"0.24" P"0.44" Q "0.00144" R 1 V"16900 ^ (1/2) equals;" W"41.1" X"130" Y"411" Z"1300" ["31.3" \ 2 `"0.04 ^ (1/2) equals;" a "0.002" b"0.02" c"0.2" d"1.6" e"0.16" f 3 j"4 ^ 3 equals;" k"12" l"16" m"64" n"81" o"128" p 3 t"(2^3) * (3^2) equals;" u"17" v"36" w"72" x"7776" y"127" z 3 ~"(3^2) ^ 3 equals;" "18" "243" "729" "6561" "81"  3 "(4^2) ^ (1/2) equal;" "4" "8" "10" "32" "64"  1 !"(2^(5/2)) * (2^(3/2)) equals;" "0.5" "2" "8" "16"  "2^(15/4)"  4 "(5^3) * (5^-1) equals;" "-625" "-25" "25" "625" "525"  3 "(8^0) * (5^0) equals;" "0" "1" "40" "400" "4000"  2 e"Which of the following do not have an exact square root? (i) 625, (ii) 2.65, (111) 3.5, (iv) 250." "(i) & (iii)" "(ii) & (iii)" "(i) & (iv)" "(iii) & (iv)" "(i) & (ii)"  4 "15% of `300 is;" "` 33" "` 45"  "` 153"  "` 315" "` 30"  2 *"30% of a number is 279. The number is;" "83.7" "93" "930" "1209" "737"  3 i"A dealer bought a T.V. set for `70. He sold it for `90. What was his percentage profit on cost price?" "20%"  "23.22%"  "28.57%"  "34.25%"  "55.76%"  3 m"A dealer bought a piano for `60 and sold it for `80. What was his percentage profit on the selling price?" "20%" "25%"  "33.33%" "75%" "55%"  2 t"A man sold a car for `400 thereby making a profit of 20% on the selling price. How much had he paid for the car?"  "` 300"  "` 333.33"  "` 392"  "` 480"  "` 372.66"  1 t"A man sold a suite for `75 thereby making a profit of 25% on the cost price. How much had he paid for the suite?" "` 50"  "` 56.25" "` 60"  "` 100" "` 72"  3 8"The simple interest on ?400 for 2 yrs at 6% p.a. is;"  "` 5.40"  "` 9.00"  "` 27.00"  "` 54.00"  "` 66.00"  4 t"The simple interest gained on a sum of money invested for 5 yrs at 4% p.a. was ` 120. What was the sum of money?" "` 20"  "` 480"  "` 600"  "` 1980"  "` 880"  3  w"A man receives a 10% increase on his monthly wage of ` 150. How much will he earn in a year at the increased rated?"  "` 1650"  "` 1800"  "` 1815"  "` 1980"  "` 2200"  4 ;"Correct to two places of decimals the number 12.847 is;" "12.8"  "12.84"  "12.85" "13" "12"  3 ["If income tax is at 40 p in the pound, how much is payable on a taxable income of `120?"  "` 4.80"  "` 7.20" ! "` 48.00" " "` 72.00" # "` 77.00" $ 3 ("If the annual tax rate in a district were fixed at 90p in the pound, what would be the half yearly amount to be paid on a property of ratable valuable `120?" )"` 12" *"` 54" + "` 108" , "` 216" - "` 256" . 2 2"An insurance company offers fire insurance at a premium of 20p per `100. What would be the annual premium on a house insured at `6500?" 3 "` 13.00" 4 "` 32.50" 5 "` 130.00" 6 "` 325.00" 7 "` 380.00" 8 1 <`"Mr Smith and Mr Jones share a prize of `20 in the ratio 2:3. How much does Mr Smith receive?" = "` 4.00" > "` 8.00" ? "` 12.00" @ "` 13.33" A "` 15.00" B 2 F|"Mary, Sally and Sue share a sum of `30. Mary receives `15 Sally receives `10. What fraction of the `30 does Sue receive?" G"` 5" H"1/5" I"1/4" J"1/3" K"1/6" L 5 Pm"In a competition Tom wins `5 and Harry wins `10. What is the ratio of Tom's winnings to Harry's winnings?" Q"1:3" R"1:2" S"2:1" T"3:1" U"2:2" V 2 Z!"What is the reciprocal of 20?" ["0.02" \"0.05" ]"2 * 5 ^ (1/2)" ^"400" _"2" ` 2 d#"What is the reciprocal of 0.02?" e "0.0004" f"0.04" g"20" h"50" i"2" j 4 n"(51^2) - (49^2) equals;" o"4" p"200" q"202" r"250" s"2552" t 2 x"2a k b - a + b equals;" y "a + 2b" z"a" { "3a + b" | "a - 2b" } "2a - 2b" ~ 1 "x - 2y - 3x - y equals;"  "4x - 3y"  "- 2x - y"  "2x - 3y"  "- 2x - 3y"  "3x - 2y"  4 "(3x + y) - (2x + y) equals;"  "x + 2y" "5x" "x"  "x - 2y"  "2x - 2y"  3 "(a + 2b) - (a - 2b) equals;"  "2a - 4b" "0" "4b" "-4b"  "- 2b + 4b"  3 #"(3x+y) - (x-2y) + (y-x) equals;" "x" "2x"  "x + 2y"  "x + 4y"  "2x + 2y"  4 "3(2a-b) - (2(3a+b) equals;" "- 5b" "- b"  "12a - 5b" "- 2b" "b"  1 "x(x+3) - x(x-2) - 2 equals;"  "x - 2"  "5x - 2" "3x" "2x^2 + 5x - 2" "2x^2"  2 "(x+1) * (x+5) equals;" "x^2 + 5x + 6" "x^2 + 6x + 5" "x^2 + 4x + 5" "x^2 + 6x + 6" "x^2 + 5x + 4"  2 "(x-1) * (x+3) equals;" "x^2 - 2x + 3" "x^2 + 2x - 3" "x^2 - 2x - 3" "x^2 + 4x - 3" "x^2 - 4x - 3"  2 "(y-4) * (y-3) equals;" "y^2 - 7y + 7" "y^2 + 7y + 7" "y^2 - 7y + 12" "y^2 - y + 12"  "y^2 + 12"  3 "(2x+3) *(3x-2) equals;" "6x^2 + 13x -6" "6x^2 - 5x - 6" "6x^2 - 5x + 6" "6x^2 + 5x - 6" "6x^2 + 6x - 5"  4  "(2x - 5y) * (x + 2y) equals;" "2x^2 - xy - 10y^2" "2x^2 - 5xy - 10y^2" "2x^2 + xy - 10y^2" "2x^2 + 4xy - 10y^2" "2x^2 + 6xy + 10y^2"  1 "(3x - 4y)^2 equals;" "9x^2 - 12xy + 16y^2" "9x^2 - 16y^2" "9x^2 + 16y^2" "9x^2 - 24xy + 16y^2" "16x^2 - 24xy + 9y^2"  4 "2(x-y)^2 + 3(x+y)^2 equals;" "5x^2 + 5y^2" "5x^2 + xy + 5y^2" "5x^2 + 2xy + 5y^2" "13x^2 + 10xy + 13y^2" "10x^2 + 13xy + 10y^2"  3 "(3x+2y) * (3x-2y) equals;" "9x^2 + 6xy - 4y^2" "9x^2 - 4y^2" "9x^2 - 6xy - 4y^2" "9x^2 - 4y^2"  "6x^2 + 4xy + 9y^2"  2 "4a^2 *3a^3 equals;" "7a^5"  "12a^5"  "12a^6"  "72a^6"  "36a^4"  2 "2ab * 3ac * 4abc equals;" "9a^2 * b^2 * c^2" "12a^3 * b^2 * c^2" "24a^3 * b^2 * c^2" "24a^2 * b^2 * c^2" "18a^3 * b^2 * c^2"  3 ""(3a)^2 * (4a)^2 equals;" # "12a^5" $ "12a^6" % "576a^5" & "576a^6" ' "576a^4" ( 4 ,"6a^4 / 2a^3 equals;" -"3a" ."3a/4" /"3/a" 0"4a" 1"3a/2" 2 1 6"(4a^2)^2 equals;" 7"4a^5" 8"4a^6" 9 "64a^5" : "64a^6" ; "64a^9" < 4 @("An interior angle of a pentagram is;" A"72 degrees" B"108 degrees" C"118 degrees" D"540 degrees" E"60 degrees" F 2 J4"The sum of the interior angles of a hexagon are;" K"5 right angles" L"6 right angles" M"8 right angles" N"12 right angles" O"10 right angles" P 3 TP"The interior angles of a regular figure are 135 degrees each. The figure is;" U"A parallelogram" V "A hexagon" W "A octagon" X "A decagon" Y"A pentagon" Z 3 ^P"ABCD is a rhombus. AB=6cm. Angle ABC=60 degrees. Calculate the length of AC." _"6 cm" `"6 * 2^(1/2) cm" a"6 * 3^(1/2) cm" b "12 cm" c"9 cm" d 1 hi"A rhombus has sides of length 13 cm and the shorter diagonal is 10 cm. Calculate the longer diagonal." i "10 cm" j "12 cm" k "12 cm" l "24 cm" m "18 cm" n 4 rJ"In triangle ABC, angle B=90 degrees. AB=8cm and BC=10cm. Calculate AC." s"3 * 2^(1/2) cm" t"6 cm" u"2 * 4^(1/2) cm" v"6 * 5^(1/2) cm" w "12 cm" x 3 |_"ABC is a tringle in which AB=6cm, BC=7cm and CA=8cm. D is the midpoint of AC. Calculate BD." }"21^(1/2) cm" ~"5 cm" "26^(1/2) cm" "(53/2)^(1/2) cm"  "13 cm"  4 _"The number of circles that can be drawn through any three points not in a straight line is;" "None" "One" "Two"  "Infinite" "Four"  2 n"The number of tangents that can be drawn to a circle from a point in the same plane outside the circle is;" "None" "One" "Two"  "Infinite" "Four"  3 `"A, B, C and D are four concyclic points. If the angle DAC is 55 degrees calculate angle DBC." "35 degrees" "55 degrees" "110 degrees" "125 degrees" "135 degrees"  2 v"A, B, C and D all lie on the circumference of a circle of centre E. If angle DBC equals 50 degrees find angle DEC." "40 dregress" "50 dregress" "100 dregress" "140 dregress" "160 dregress"  3 U"The angle subtended by a diameter of a circle at a point on the circumference is;" "25 degrees" "30 degrees" "65 degrees" "135 degrees" "90 degrees"  2 K"If a circle can be drawn through four given points then the points are;"  "Concyclic" "Equidistant"  "Collinear"  "Identical" "None of these"  1 U"ABCD is a cyclic quadrilateral. If angle ABC is 125 degrees, calculate angle CDA." "55 degrees" "62.5 degrees" "125 degrees" "225 degrees" "180 degrees"  1 B"The opposite angles of a cyclic quadrilateral are necessarily;" "Supplementary" "Complementary"  "Equal"  "Obtuse" "All of these"  1 ֖"Which of the following figures have diagonals necessarily at right angles to each other? (i) Rhombus. (ii) Kite. (iii) Square. (iv) Parallelogram." "All of these" "(i), (ii) and (iii)" "(i), (ii) and (iv)" "(i) and (iii) only" "None of these"  2 "Y is 1 Km from X and 1 Km from Z. The bearing of Y from Z is 180 degrees and the bearing of X from Y is 270 degrees. Calculate the bearing of X from Z." "45 degrees" "90 degrees" "135 degrees" "225 degrees" "270 degrees"  4 "B and C are each 10 Km from D. The bearing of C from D is 140 degrees. The bearing of C from B is 90 degrees. Calculate the bearing of B from D." "40 degrees" "50 degrees" "130 degrees" "220 degrees" "270 degrees"  4 4"The sum of the interior angles of an octagon is;" "1.5 right angles" "10 right angles" "12 right angles" "16 right angles" "18 right angles"  3 "X, Y and Z lie at the vertices of an equalateral triangle. From X, Y lies on a bearing N 40 deg E. What is the bearing of Z from X." "170 degrees" "160 degrees" "190 degrees" "340 degrees" "270 degrees"  2 "Tan /4 equals"  "1/(2^(1/2))"  "(3^(1/2))/2"  "1"  "2^(1/2)"  "2"  3 "Sin 90 deg equals;" "-1" "0" "(3^(1/2))/2" "1" ""  4 "Sin 75 deg equals;" "1 - Sin 15 degrees" "Tan 15 degrees" "1 - Cos 15 degrees"  "1 / (Cos 15 degrees)" !"Cos 15 degrees" " 5 &"Cos 60 degrees equals;" '"1/2" ("1/(2^(1/2))" )"(3^(1/2))/2" * "3^(1/2)" +"Tan 45 degrees" , 1 0""1 / (2^(1/2)) is the value of;" 1"Cos 30 degrees" 2"Cos 60 degrees" 3"Sin 45 degrees" 4"Tan 45 degrees" 5"Sin 60 degrees" 6 3 :%"If Sin a = 0.8 then Tan a equals;" ;"4/3" <"3/4" ="5/3" >"5/4" ?"3/5" @ 1 D"Tan 0 degrees equals;" E"-1" F"0" G"1" H"45" I "Infinity" J 2 N""(3^(1/2)) / 2 is the value of;" O"Cos 60 degrees" P"Tan 30 degrees" Q"Sin 30 degrees" R"Cos 30 degrees" S"Tan 60 degrees" T 4 XK"If Tan (x+30 deg) = 1 then what is the numerically smallest value of x?" Y"-29" Z"15" ["45" \"60" ]"90" ^ 2 b"Tan 40 degrees equals;" c"Sin 50 degrees" d"Cos 140 degrees" e"1 / Tan 50 degrees" f"-Tan 50 degrees" g"-Cos 140 degrees" h 3 l"2^(1/2) is the value of;" m"Sin 60 degrees" n"1 / Sin 45 degrees" o"Cos 45 degrees" p"Tan 60 degrees" q"Tan 45 degrees" r 2 v"Cos 120 degrees equals;" w"-1/2" x"-(3^(1/2)) / 2" y"1/2" z"(3^(1/2)) / 2" {"1 / (3^(1/2))" | 1 Q"If x is an obtuse angle and Tan (x+30) degrees = -1 then find the value of x." "-31" "15" "105" "115" "270"  3 8"If a is an obtuse angle and Sin a = 4/5, find Cos a." "-4/5" "-3/5" "3/5" "4/3" "-4/3"  2 "Tan 150 degrees"  "-3^(1/2)" "-1 / (3^(1/2))" "1 / (3^(1/2))"  "3^(1/2)"  "-3^(1/2)"  2 J"If angle a is acute and Tan (180-a) degrees = -7/24 then Sin a equals;"  "-24/25"  "-7/25" "7/24" "7/25" "24"  4 /"If a = 30 degrees then 0.5 * Sin 2a equals;" "(3^(1/2)) / 4" "3/4" "1"  "3^(1/2)" "-3/4"  1 "Cos equals;" "-1" "0" "1" "3.14"  "1 / 3.14"  1 "2 * Sin (/2) equals;" "-2" "0" "1/2" "2" "-1/2"  4 +"Sin 30 degrees + Sin 60 degrees equals;" "1" "(1 + 3^(1/2)) / 2" "1 + (3^(1/2)) / 2" "0.5 + 3^(0.5)" "-1"  2 P}! ` 50 ` 56.25 ` 60 ` 100 ` 72 cqkEmuch had he paid for theQsuite?