## PPSC PAST LECTURES MATH PAPER

PPSC PAST LECTURES MATH PAPER.Old PPSC Written tests for Lecturer (Mathematics). Past Written tests (papers) of Punjab Public Service Commission. PCS/PMS Exam Mathematics Past Papers of are accessible here. Here Pakistani understudies can get Punjab Public Service Commission Exams Mathematics Past Paper MCQS.

### QUESTION ARE GIVES BELOW…..

0 is the added substance personality.

1 is the multiplicative personality.

2 is the main even prime.

3 is the quantity of spatial measurements we live in.

4 is the most modest number of hues adequate to shading every planar guide.

5 is the quantity of Platonic solids.

6 is the littlest flawless number.

7 is the most modest number of sides of a customary polygon that is not constructible by straightedge and compass.

8 is the biggest 3D shape in the Fibonacci grouping.

9 is the most extreme number of 3D squares that are expected to total to any positive whole number.

10 is the base of our number framework.

11 is the biggest known multiplicative tirelessness.

12 is the littlest bottomless number.

13 is the quantity of Archimedian solids.

14 is the littlest significantly number n without any answers for φ(m) = n.

15 is the littlest composite number n with the property that there is just a single gathering of request n.

16 is the main number of the shape xy = yx with x and y being diverse whole numbers.

17 is the quantity of backdrop gatherings.

18 is the main positive number that is double the whole of its digits.

19 is the most extreme number of fourth powers expected to whole to any number.

20 is the quantity of established trees with 6 vertices.

21 is the most modest number of particular squares expected to tile a square.

22 is the quantity of allotments of 8.

23 is the most modest number of whole number sided boxes that tile a crate so that no two boxes share a typical length.

24 is the biggest number distinguishable by all numbers not as much as its square root.

25 is the littlest square that can be composed as a whole of 2 positive squares.

26 is the main positive number to be specifically between a square and a solid shape.

27 is the biggest number that is the total of the digits of its 3D shape.

28 is the second impeccable number.

29 is the seventh Lucas number.

30 is the biggest number with the property that every single more modest number moderately prime to it are prime.

31 is a Mersenne prime.

32 is the littlest non-trifling fifth power.

33 is the biggest number that is not an entirety of unmistakable triangular numbers.

34 is the most modest number with the property that it and its neighbors have a similar number of divisors.

35 is the quantity of hexominoes.

36 is the littlest non-insignificant number which is both square and triangular.

37 is the most extreme number of fifth forces expected to whole to any number.

38 is the last Roman numeral when composed lexicographically.

39 is the most modest number which has 3 distinct segments into 3 sections with a similar item.

40 is the main number whose letters are in sequential order arrange.

41 is an estimation of n so that x2 + x + n goes up against prime esteems for x = 0, 1, 2, … n-2.

42 is the fifth Catalan number.

43 is the quantity of sided 7-iamonds.

44 is the quantity of disturbances of 5 things.

45 is a Kaprekar number.

46 is the quantity of various courses of action (up to turn and reflection) of 9 non-assaulting rulers on a 9×9 chessboard.

47 is the biggest number of 3D squares that can’t tile a 3D shape.

48 is the most modest number with 10 divisors.

49 is the most modest number with the property that it and its neighbors are squareful.

50 is the most modest number that can be composed as the aggregate of 2 squares in 2 ways.

51 is the sixth Motzkin number.

52 is the fifth Bell number.

53 is the main two digit number that is switched in hexadecimal.

54 is the most modest number that can be composed as the aggregate of 3 squares in 3 ways.

55 is the biggest triangular number in the Fibonacci succession.

56 is the quantity of lessened 5×5 Latin squares.

57 = 111 in base 7.

58 is the quantity of commutative semigroups of request 4.

59 is the quantity of stellations of an icosahedron.

60 is the most modest number distinct by 1 through 6.

61 is the third secant number.

62 is the most modest number that can be composed as the aggregate of 3 particular squares in 2 ways.

63 is the quantity of halfway requested arrangements of 5 components.

64 is the most modest number with 7 divisors.

65 is the most modest number that turns out to be square if its invert is either added to or subtracted from it.

66 is the quantity of 8-iamonds.

67 is the most modest number which is palindromic in base

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