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The Moscow papyrus, which dates to around 1890 BC and is also from the Middle Kingdom era, is a notable Egyptian mathematical document. It comprises what is now known as word problems or narrative problems and was ostensibly created for amusement purposes. One issue is seen to be especially significant since it provides a way for calculating a frustum’s volume (truncated pyramid). A second-order algebraic problem could be solved by ancient Egyptians, as evidenced by the Berlin Papyrus 6619, which dates to around 1800 BC.
Greek mathematics is the branch of mathematics that covers the period from Thales of Miletus (c. 600 BC) to the dissolution of the Academy of Athens in 529 AD. Greek mathematicians had a common language and culture while living in towns all throughout the Eastern Mediterranean, from Italy to North Africa. Hellenistic mathematics refers to Greek mathematics from the time after Alexander the Great.
Greek mathematics was far more advanced than the mathematics created by prior civilizations. All of the pre-Greek mathematical writings that have survived demonstrate the use of inductive reasoning, or the utilization of repeated observations to create generalizations. On the other hand, deductive reasoning was employed by Greek mathematicians. The Greeks utilized rigorous mathematics to verify their arguments and logic to draw inferences from definitions and axioms.
Maths Trivia Questions
1. A Six-Sided Die Is Rolled Once. What Is The Probability That The Number Rolled Is An Even Number Greater Than 2?
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2. Sum Of -5 And -6 Is
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3. There Are 6 Boxes Of pens In A Store. There Are 4 Pencils In Each Box. How Many Pencils Are In The Store
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4. What Is The Square Root Of 36?
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5. What Does 3 Square Equal?
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6. What Does The Roman Numeral ( C ) Represent?
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6. True or False? All sides are equal in the Isosceles Triangle.
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7. True Or False? A Convex Shape Curves Outwards.
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8. 52 Divided By 4 Equals What?
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9.Are opposite angles of a parallelogram equal?
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10. Sum Of 2s + 4t -3u + 5v, -S + 2t + 9u - 11v And 3s - 4t + 2u - 3v Is
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11. What Is The Bigger Number, A Googol Or A Billion?
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12. Of 2a + B + 5c And -5a - 2b + 3c Is
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13. There Are 4 More Peacocks Than Rabbits in a Farm. The Total Number of Legs (peacock And Rabbits) Is Equal to 44. How many peacocks And How Many Rabbits Are There?
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14. What Is The Symbol For Milliliters?
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15. What Is The Value Of 4x + 9, When X = 4?
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15. What Is (1-1)=?
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16. True Or False? Pi Can Be Correctly Written As A Fraction.
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16.
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17. Tresela Has 20 Orange Gums. She Gave 5 Gums To Mary And 3 Gums To Sam. She Bought 12 Gums Again From Which She Lost 6 Gums. Number Of Gums Tresela Have Are
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18. Product Of -140 And +8 Is
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19. What Is (15-4)=?
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20. What Is (15-15)=?
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21. By Solving -2 + 8 + ( -24 / -2), Answer Is
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22. By Solving ( -72 / -8 ) + ( -3 X -9 ) + (-4) +2, You Will Get
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23. There are a total of 16 peacocks and tigers In a Farm. The total number of legs (peacock and tigers) is equal to 50. How Many peacocks and How Many tigers are there?
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24. Mr Joseph Runs 3 Kilometers Everyday From Monday To Friday. He Also Runs 10 Kilometers A Day On Saturday And Sunday. How Many Kilometers Does Joshua Run In A Week?
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25. The Cost Of Buying A Tall Building Is One Hundred Twenty One Million Dollars. Write This Number In Standard Form.
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26. Order From Greatest To Least The Fractions 1/3 , 1/6 , 1/2 , 1/7.
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26. Round 312.92 To The Nearest Whole Number.
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27. Angles In Opposite Segments Are Classified As?
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28. How Many Milliliters In One Liter?
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29. 150: Sum Of 5x + 3y And 4x - 2y Is
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30. What Does Century Represents?
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31. Is -2 An Integer?
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32. Who Invented The Telephone?
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33. If Following Pattern Is Considered 2² + 1 = 5, 3² + 1 = 10, 4² + 17, 5² + 1 = 26, . . . . . . ., Then Value Of X In X²+1 = 170 Will Be
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34. Out Of Following Rational Numbers 6/10, 4/15, 8/11 And 3/4, Smallest Rational Number Is
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35. Which Is Greater -50 Or 2?
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35. What Is (87=80)=?
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36. In A City Book Store, 70% Of Books Are Classified As Fiction and Remainder As non-fiction. There are 2400 more fiction Books than non-fiction books. At an average cost of $22, the owner wants to increase Fiction Books By 5%. Is The Cost Of New Fiction Books Is?
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37. Henry And Hazel Earn Income Of $5000. Expenses They Have To Meet Are Food $500, House Loan $450, Electricity, Water And Gas $135. Telephone $50 And Car Maintenance $155. Monthly Saving As %Age Of Income Is
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38. If A = 9.7 Cm, Angle B = 64° And C = 8.8 Cm Then Area Of ? ABC Is
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39. Formula Used To Measure Circumference Of Circle Is
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40. Factorization Of P(4q + 3) +4(4q+3) Leads To
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41. Answer Of Factorization Of Expression (3x - 2y)(A + B) + (4x - 3y)(A + B) Is
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42. Convert The Decimal 49/7 Into A Fraction In Simplest Terms.
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43. If The New Cube Has A Volume Of 64,000 Cubic Centimeters, What Is The Area Of One Face Of The Original Cube?
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44. If The Radius of a cylindrical container is multiplied by 2, How Do You Change The length Of The Container So That The Volume Will Stay The Same?
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45. Find The Greatest Common Factor Of 24, 40 And 60.
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46. If A Handbag Is Sold For $2000 At Gain Of 20% On Cost Price Then Cost Is
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47. Angle Which Is Less Than 90° Is Called
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48. John Has Two Beepers Red And Green. Green Beeper Beeps Every 35 Seconds And Red Beeper Beeps Every 45 Seconds. How Many Seconds Do Both Beepers Beep At the Same time?
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49. What Is The Unit Of Density Measurement?
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50. In Following Number Sequence 40960, 10240, 2560, 640, Next Three Numbers In Sequence Are
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51. One Cubic Centimeter Is Equal To How Many Milliliters?
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52. Taylor Pays $5.25 For 0.5 Yards Of Fabric. What Is The Cost Per Yard?
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53. What Is X If X + 2y = 10 And Y = 3?
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54. Kind Of Triangle Which Has Two Equal Sides Is
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55. A Plane Which Is Formed By Three Straight Edges As Its Sides Is Called
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56. How Many Sides Does A Hexagon Have?
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57. 1000 Times 431=?
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58. How Many Times Does 6 Divide To 18 Evenly?
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59. Right-Angled Triangle Must Have
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60. Obtuse-Angled Triangle Must Have
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61. If there Are 1000 People In A City And 567 Of Them Went To The Hockey Game How Many Didn't Go?
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62. What Is The Value Of (14 + 5) - (5 - 2)
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63. If You Subtract 50 From -30 Then Answer Will Be
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64. A Telephone Company Charges Initially $0.50 and Then $0.11 For Every Minute. Cost that last minute.
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65. A Car Travels At A Speed Of 65 Miles Per Hour. How Far Will It Travel In 6 Hours?
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66. What Temperature Scale Is Used Most Often In The U.S. For Weather?
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67. If A Book Is Sold For $250 At 15% Loss On Cost Then Cost Price Of Book Is
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68. Area of a circle is 81pi square feet, find its circumference.
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69. Two Numbers x And 16 Have LCM = 48 And GCF = 8. Find x.
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70. One Pump Fills A Tank Two Times As Fast As Another Pump. The pump fills the tanks in 18 minutes. How much time does a single pump take to fill the tank all alone?
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71. Angles That Have Common Vertex And A Common Side On A Line Are Classified As
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72. On A Line, Sum Of Adjacent Angles Is Equal To
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73. If Circumference Of Circle Is 82p Then Value Of 'R' Is
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74. In Formula 2pr, 'R' Is Considered As
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75. Formula Used To Measure Area Of Circle Is
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76. Two Trigonometric Ratios Whose Values Cannot Be Greater Than 1 Are?
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77. Out Of Following Rational Numbers 4/8, 2/6, 9/12 And 10/17, Greatest Rational Number Is
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78. What Is (67-68)=?
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79. Which Of These Numbers Is Not An Integer -2, 0, 100, ½?
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80. In the College Library, 30% Of Books Are Classified As Fiction And Remainder As Non-Fiction. There Are 2400 More Books non-fiction category than Fiction Category. Total Number Of non-fiction books in the Library Is?
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81. If Circumference Of Circle Is 64p Then Area Of Circle (In Terms Of ?) Is
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82. Formula For Area Of A Triangle Is
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83. In The Metric System, What Is The Basic Metric Unit Of Mass?
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84. What Are Integers?
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85. What Are Whole Numbers?
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86. There Are 365 Days In One Year, And 100 Years In One Century. How Many Days Are In One Century?
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87. Numbers That Have Only Two Factors And Are Different From Each Other Are Called
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88. What Comes Next In The Fibonacci Sequence 0,1,1,2,3,5,8,13,---?
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89. What Does The Square Root Of 144 Equal?
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90. Identify The Smallest Prime Number.
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91. What Is The Prefix Meaning “10”?
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92. Largest Composite Number Less Than 40 Is
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93. Composite Numbers Has
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94. A number system with the base of 2 is called?
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95. What Is The Square Root Of 81?
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96. What Is (115-71)=?
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97. 21/7=?
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98. What Is 21*0=?
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100. What Is (25+24)-10=?
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101. In Which Ancient Civilization introduced the representation of digits into words?
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102. Josh Has 10 Candies. He Gave 4 Candies To Philip And Phillip Returned 2 Candies To Josh After Few Days. Number Of Candies Josh Has Altogether Are
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103. By Evaluating Following 170 - (+40) + (-50) +5 - (+20), Answer Will Be
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104. What Comes After Thousand?
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105. How Many Equal Sides Do An Icosahedron Have?
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106. Tom, Julia, Mike, And Fran Have 175 Cards To Use In A Certain Game. They Decided To Share Them Equally. How Many Cards Should Each One Take And How Many Cards Are Left?
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107. What Is The Value Of P In 24 = 2p?
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108. If You Add 1,000 To 29,898, You Obtain
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109. Convert 5/10 To Decimal.
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110. When You Subtract 1,995 From 4,008, The Answer Is Equal To
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111. Considering Following Pattern 2 X (2 - 1) = 2, 3 X (3 - 1) = 6, 4 X (4 - 1) = 12, 5 X (5 - 1) = 20, 8th Line In Pattern Will Be
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The method of exhaustion, a forerunner to contemporary integration, and a theory of ratios that circumvented the issue of incommensurable magnitudes were created by Eudoxus (408–c. 355 BC). The former made it possible to calculate the areas and volumes of curved forms, while the latter made it possible for later geometers to make important geometric advancements. Aristotle (384–c. 322 BC), who did not make any particular technical mathematical discoveries, nevertheless made a significant contribution to the growth of mathematics by establishing the principles of logic.
The Museum of Alexandria was the foremost institution for mathematical instruction and study in the third century BC. There, Euclid (c. 300 BC) taught and penned the Elements, widely regarded as the most important and successful textbook in history. The Elements is the first example of the definition, axiom, theorem, and proof style still used in mathematics today. It also established mathematical rigor through the axiomatic approach. Euclid organized the Elements’ contents into a single, cohesive logical framework even though the majority of what they contained was already known.
Up until the middle of the 20th century, all educated individuals in the West were familiar with The Elements, and its concepts are still taught in geometry classrooms today. The Elements was intended to serve as an introductory textbook to all mathematical disciplines at the time, including number theory, algebra, and solid geometry. It includes proof that the square root of two is irrational and that there are infinitely many prime numbers, in addition to the well-known theorems of Euclidean geometry. Only half of Euclid’s publications on other topics, such as conic sections, optics, spherical geometry, and mechanics, have survived.
The area under the arc of a parabola can be calculated using the method of exhaustion and the summation of an infinite series, which is not dissimilar to how calculus is used today. Archimedes of Syracuse (c. 287–212 BC), who is regarded as the greatest mathematician of antiquity, used this technique. Additionally, he demonstrated how the process of exhaustion could be used to compute with as much accuracy as required, yielding the then-known most precise number of 310/71 < π < 310/70.
He also researched the spiral that bears his name, discovered formulae for the volumes of surfaces of revolution (paraboloids, ellipsoids, and hyperboloids), and devised a clever way to represent extremely big numbers via exponentiation. Although he is also credited with developing a number of cutting-edge mechanical gadgets and advances in physics, Archimedes himself put a much higher weight on the results of his thought and fundamental mathematical ideas. He considered his discovery of the surface area and volume of a sphere, which he acquired by demonstrating that these are 2/3 the surface area and volume of a cylinder circumscribing the sphere, to be his greatest accomplishment.
By demonstrating that one may acquire all three types of conic sections by changing the angle of the plane that slices a double-napped cone, Apollonius of Perga (c. 262-190 BC) made important advancements in the study of conic sections. He also developed the terms that are still in use today for conic sections, including “parabola,” “ellipse,” and “hyperbola” (“a throw beyond”). He derives several theorems on conic sections in his book Conics, one of the best-known and best-preserved mathematical works from antiquity, which would be helpful to subsequent mathematicians and astronomers researching planetary motion, including Isaac Newton. While neither Apollonius nor any other Greek mathematicians made the transition to coordinate geometry, Apollonius’ study of curves is rather contemporary in nature, and part of his work appears to predate Descartes’ 1800-year-later invention of analytical geometry.
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