MADRAS VOCATIONAL TRAINING INSTITUTE. (Recognised By Government Of India And Tamilnadu, Affiliated To NCVT) MATHS

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MADRAS VOCATIONAL TRAINING INSTITUTE (Recognised By Government Of India And Tamilnadu, Affiliated To NCVT) MATHS Courtesy Masters Academy and Software Solutions A Provider of Educational Software for

1 MADRAS VOCATIONAL TRAINING INSTITUTE (Recognised By Government Of India And Tamilnadu, Affiliated To NCVT) MATHS Courtesy Masters Academy and Software Solutions A Provider of Educational Software for X, XI and XII Standards. Phone : Madras Vocational Training Institute, 7-19A Cross Street, Lenin Nagar, Ambattur, Chennai 53 madrasvocationaliti@gmail.com Website :

2 Xth - FORMULA CALENDER 1. SETS AND FUNCTIONS Definition for Sets: A Set is a collection of well-defined objects. The objects in a set are called elements or members of that set. 1. Commutative property The Commutative property states that order does not matter. Multiplication and addition are commutative AUB = BUA A B = B A. Associative property The associative property states that you can add or multiply regardless of how the numbers are grouped. AU( BUC) = (AUB)UC A ( B C) = (A B) C 3. Distributive property The distributive property lets you multiply a sum by multiplying each addend separately and then add the products. 4. De Morgan s laws AU( B C) = (AUB) (AUC) A ( BUC) = (A B)U(A C) The complement of the union of two sets is equal to the intersection of their complements and the complement of the intersection of two sets is equal to the union of their complements. i) (AUB) = A B ii) (A B) = A U B 5. Cardinality of sets iii) A (BUC) = (A B) (A C) iv) A (B C) = (A B)U (A C) v ) A / (BUC) = (A / B) (A / C) vi) A / (B C) = (A / B)U (A / C) The cardinality of a set is a measure of the "number of elements of the set". For example, the set A = {, 4, 6} contains 3 elements, and therefore A has a cardinality of 3. i) n(aub) = n(a) +n(b) n(a Β) Ii) n(aubuc) = n(a) + n(b) + n(c) n(a B) n(b C) n(a C) + n(a B C) 6. Representation of functions A set of ordered pairs, a table, an arrow diagram, a graph.

3 7. Operations on Sets 1. Union XUY = { z z Є X or z Є Y }. Intersection X ꓵ Y = { z z Є X or z Є Y } 3. Set Difference X \ Y = { z z Є X but z Є(not) Y } 4. Symmetric Difference x y = ( x \ y ) U ( y / x ) 5. Complement 6. Disjoint Sets 7. Types of functions 1. One-One function Every element in A has an image in B.. Onto function Every element in B has a pre-image in A. 3. One-One and onto function Both a one-one and an onto function. 4. Constant function Every element of A has the same image in B. 5. Identity function An identity function maps each element of A into itself.. SEQUENCES AND SERIES OF REAL NUMBERS Arithmetic sequence or Arithmetic Progression (A.P.) Sequences If a sequence has only finite number of terms, then it is called a Finite sequence If a sequence has infinitely many terms, then it is called a Infinite sequence 1. General form a, a+d, a+d, a+3d,.....

4 . Three consecutive terms a d, a, a + d 3. The number of terms n = General term t n = a + (n 1 )d 5. The sum of the first n terms (if the common difference d is given.) S n = [ a + (n 1)d ] 6. The sum of the first n terms (if the last term l is given.) S n = [ a + l] Geometric Sequence or Geometric Progression (G.P.) A sequence a 1, a, a 3, a n is called a geometric sequence if a n+1 = a n r, n Є N, where r is a non-zero constant. Here a 1 is the first term and the constant r is called the common ratio. A geometric sequence is also called a Geometric Progression (G.P) 7. General form a, ar, ar,ar 3,...,ar n 1, ar n, General term t n = ar n 1 9. Three consecutive terms a / r, a, ar Special series 10. The sum of the first n natural numbers, n = n(n+1) 11. The sum of the first n odd natural numbers, ( k 1 ) = n 1. The sum of first n odd natural numbers (when the last term l is given) l = ( l+1 ) 13. The sum of squares of first n natural numbers, k = n(n+1)(n+1) The sum of cubes of the first n natural numbers, k 3 = ( n(n+1) ) 15. Sum of first n terms, if d is given, s n = n [a+(n-1)d] 16. Sum of first n terms, if the last term L is given, s n = n [a+(n-1)d] 17. Sum of the first n terms of a geometric series

5 s n = a(rn 1) r 1 = a(1 rn ) 1 r, if r 1 3. ALGEBRA 1 (a + b) = a + ab + b (a - b) = a - ab + b 3 a - b = (a + b) (a-b) 4 a + b = (a + b) - ab 5 a + b = (a - b) + ab 8 a 3 + b 3 = (a + b) (a ab + b ) 9 a 3 - b 3 = (a - b) (a + ab + b ) 10 a 3 + b 3 = (a + b) 3 3ab (a + b) 11 a 3 - b 3 = (a - b) 3 + 3ab (a - b) 1 a 4 +b 4 = (a +b ) - a b 13 a 4 - b 4 =(a +b)(a - b)(a + b ) 14 (a + b + c) = a + b +c + (ab + bc +ca) 15 (x +a) (x+b) = x + (a+b) x + ab 16 (x +a)(x+b)(x+c) = x 3 + (a+b+c) x + (ab+bc+ca) x + abc Quadratic polynomials ax + bx + c = 0 17 sum of zeros ( α + β ) = - coefficient of x / coefficient of x 18 product of zeros ( α β ) = constant term / coefficient of x 19 Quadratic polynomials with zeros α and β. : x - ( α + β ) x + ( α β ) 0 Relation between LCM and GCD : L CM x GCD = f(x) x g(x) 1 Nature of roots Δ = b - 4ac Δ > 0 Real and unequal = 0 Real and equal. Δ < 0 No real roots. (It has imaginary roots) Δ

6 Formation of quadratic equation when roots are given X ( sum of roots) x + ( product of roots ) = 0 4. MATRICES 1. Matrix : A matrix is a rectangular array of numbers in rows and columns enclosed within square brackets and parenthesis.. Square matrix : A matrix in which the number of rows and the number of columns are equal 3. Diagonal matrix : A square matrix in which all the elements above and below the leading diagonal are equal to zero 4. Scalar matrix : A diagonal matrix in which all the elements along the leading diagonal are equal to a non-zero constant 5. Unit matrix : A diagonal matrix in which all the leading diagonal entries are 1 6. Null matrix or Zero-matrix : A matrices has each of its elements is zero. 7. Transpose of a matrix : A matrices has interchanging rows and columns of the matrix 8. Negative of a matrix : The negative of a matrix A is - A 9. Equality of matrices : Two matrices are same order and each element of A is equal to the corresponding element of B 10. Two matrices of the same order, then the addition of A and B is a matrix C 11. If A is a matrix of order m x n and B is a matrix of order n x p, then the product matrix AB is m x p.

7 13. Properties of matrix addition Commutative A +B = B + A Associative A + (B + C) = (A + B) +C Existence of additive identity A + O = O + A =A Existence of additive inverse A + ( A) = ( A) + A = O 14. Properties of matrix multiplication Not commutative in general Associative A B = BA A(BC) = (AB)C distributive over addition A(B + C) = AB + AC (A + B)C = AC + BC Existence of multiplicative identity A I = I A = A Existence of multiplicative inverse AB = BA = I 15. (A T ) T = A ; (A +B) T = A T + B T ; (AB) T = B T A T 5. COORDINATE GEOMETRY 1. Distance between Two points AB = (x x1) + (y y1). The line segment joining the two points A(x1,y1), and B(x,y) internally in the ratio l : m is P( lx+mx1, ly+my1 ) l+m l+m 3. The line segment joining the two points A(x1,y1), and B(x,y) internally in the ratio l : m is P( lx mx1, ly my1 ) l m l m 4. The midpoint of the line segment M=( x1+x, y1+y ) ) 5. The centroid of the triangle G=( x1+x+x3, y1+y+y Area of a triangle A = 1 Σ x1(y y3) sq.unit 7. Area of the Quadrilateral A = 1 x x3 x4 x1 (x1 y1 y y3 y4 y1 )sq.unit. 8. Collinear of three points Σ x1(y y3) = 0 9. If a lines makes an angle θ with the positive direction of x-axis, then the slope m = tan θ 10. Slope of the non vertical line passing through the points m = y y1 x x1 11. Slope of the line ax+by+c=0 is m = a b 1. The Straight line ax+by+c=0, y intercept c y = c b 13. Two lines are parallel if and only if their slopes are equal, m1 = m. 14. Two lines are perpendicular if and only if the product of their slopes is -1. m1 m = -1 Equation of straight lines

8 15. x axis y = y axis x = Parallel to x-axis y = k 18. Parallel to y-axis x = k 19. Parallel to ax+by+c = 0 ax+by+k = 0 0. Perpendicular to ax+by+c = 0 bx-ay+k = 0 1. Passing through the origin y = mx. Slope m, y-intercept c y = mx + c 3. Slope m, a point (x1, y1) y y1 = m(x-x1) 4. Passing through two points (x1, y1), (x, y) 5. X-intercept a, y-intercept b y y1 = x x1 y y1 x x1 x a + y b = 1 6. GEOMETRY 1. Basic Proportionality theorem or Thales Theorem If a straight line is drawn parallel to one side of a triangle intersecting the other two sides, then it divides the two sides in the same ratio.. Converse of Basic Proportionality Theorem ( Converse of Thales Theorem) If a straight line divides any two sides of a triangle in the same ratio, then the line must be parallel to the third side. 3. Angle Bisector Theorem The internal (external) bisector of an angle of a triangle divides the opposite side internally (externally) in the ratio of the corresponding sides containing the angle. 4. Converse of Angle Bisector Theorem If a straight line through one vertex of a triangle divides the opposite side internally (externally) in the ratio of the other two sides, then the line bisects the angle internally (externally) at the vertex. 5.Pythagoras theorem (Baudhayan theorem) In a right angled triangle, the square of the hypotenuse is equal to the sum of the squares of other two sides. 6. Two Triangles are similar if, their corresponding angles are equal (or) their corresponding sides have lengths in the same ratio (or proportional) which is equivalent to saying that one triangle is an enlargement of other. 1. AA( Angle-Angle ) similarity criterion If two angles of one triangle are respectively equal to two angles of another triangle, then the two triangles are similar.

9 . SSS (Side-Side-Side) similarity criterion for Two Triangles In two triangles, if the sides of one triangle are proportional (in the same ratio) to the sides of the other triangle, then their corresponding angles are equal 3. SAS (Side-Angle-Side) similarity criterion for Two Triangles If one angle of a triangle is equal to one angle of the other triangle and if the corresponding sides including these angles are proportional, then the two triangles are similar. 4. Tangent-Chord theorem If from the point of contact of tangent (of a circle), a chord is drawn, then the angles which the chord makes with the tangent line are equal respectively to the angles formed by the chord in the corresponding alternate segments. 5. Converse of Theorem If in a circle, through one end of a chord, a straight line is drawn making an angle equal to the angle in the alternate segment, then the straight line is a tangent to the circle. 6. If two chords of a circle intersect either inside or out side the circle, the area of the rectangle contained by the segments of the chord is equal to the area of the rectangle contained by the segments of the other P A X PB = PC X PD CIRCLES AND TANGENTS 1. A tangent at any point on a circle is perpendicular to the radius through the point of contact.. Only one tangent can be drawn at any point on a circle. However, from an exterior point of a circle two tangents can be drawn to the circle. 3. The lengths of the two tangents drawn from an exterior point to a circle are equal. 4. If two circles touch each other, then the point of contact of the circles lies on the line joining the centres. 5. If two circles touch externally, the distance between their centres is equal to the sum of their radii. 6. If two circles touch internally, the distance between their centres is equal to the difference of their radii. 7. TRIGNOMETRY 1. sin θ + cos θ = 1 ; sin θ = 1 - cos θ; cos θ = 1 - sin θ. 1 + tan θ = sec θ ; sec θ - tan θ = 1; tan θ = sec θ - 1; 3. cot θ + 1 = cosec θ; cot θ = cosec θ 1; cosec θ - cot θ = 1 4. sin (90 θ)= cos θ cosec (90 θ)= sec θ 5. cos (90 θ)= sin θ sec (90 θ) = cosec θ 6. tan (90 θ)= cot θ cot (90 θ) = tan θ

10 7. sin θ cosec θ = 1 ; sin θ = 1/ cosec θ ; cosec θ = 1/ sin θ 8. cos θ sec θ = 1 ; cos θ = 1/ sec θ ; sec θ = 1/ cos θ 9. tan θ cot θ = 1 ; tan θ = 1/ cot θ ; cot θ = 1/ tan θ 10. tan θ = sin θ / cos θ; cot θ = cos θ / sin θ; 11. Componendo and divideno rule, If a = c a+b then, = c+d b d a b c d Angle Sin θ Cos θ Tan θ S.No Name Surface Area (SA) (Sq.units) 1 Solid right circular cylinder Right circular hollow cylinder 3 Solid right circular cone 8. MENSURATION Total Surface Area (TSA) (Sq.units) Volume (cubic.units) rh r(h+r) r h (R+r)h (R+r) (R-r+h) (R r )h rl r(l+r) 1 3 r h 4 Frustum (R + r + Rr)h 5 Sphere 4 r r3 6 Hollow Sphere ( R3 r 3 ) 7 Solid Hemisphere r 3 r 3 r3 8 Hollow Hemisphere (R + r ) (3R + r ) 3 ( R3 r 3 ) 9. Cone I = h + r ; h = l r ; r = l h 10. CSA of a cone = Area of the sector rl = θ 360 r 11. Length of the sector = Base circumference of the cone

11 L = r 1. Volume of water flows out through a pipe = {Cross section area x Speed x Time} 13. No.of new solids obtained by recasting = Volume of solid which is melted Volume of one solid which is made 14. 1m 3 = 1000 litres 1000 litres = 1 k.l 1 d. m 3 = 1 litres 1000 cm 3 = 1 litres 1. Range R = L S. Coefficient of Range Q = L s L+s 3. Standard Deviation (Ungrouped) 1. Direct Method σ = Σx n (Σx n ) 11. STATISTICS. Actual mean Method σ = Σd 3. Assumed mean Method σ = Σfd Σf n (Σfd Σf ) Here d = x - ẋ Here d = x A 4. Step deviation Method σ = Σd n (Σd n ) x c Here d = x A c 4. Standard Deviation (Grouped) 1. Actual mean Method σ = Σfd Σf. Assumed mean Method σ = Σfd Σf 3. Step deviation Method σ = Σfd Σf (Σfd Σf ) (Σfd Σf ) x c Here d = x - ẋ Here d = x A Here d = x A c 5. Standard deviation of the first n natural numbers, σ = n 1 6. Variance is the square of standard deviation. Standard deviation of a collection of data remains unchanged when each value is added or subtracted by a constant. 7. Standard deviation of a collection of data gets multiplied or divided by the quantity k, if each item is multiplied or divided by k. 8. Coefficient of variation, C.V = σ x x 100 It is used for comparing the consistency of two or more collections of data PROBABILITY

12 1. Tossing an unbiased coin once S = { H, T }. Tossing an unbiased coin twice S = { HH, HT, TH, TT } 3. Rolling an unbiased die once S = { 1,, 3, 4, 5, 6 } 4. The probability of an event A lies between 0 and 1,both inclusive 0 P(A) 1 5. The probability of the sure event is 1. P(S)= 1 6. The probability of an impossible event is 0. P(ɸ) = 0 7. The probability that the event A will not occur P(Ā) = 1 P(A) 8. P(A) + P(Ā) = 1 9. P(A ꓵ Ḇ) = P(A) P(A ꓵ B) 10. Addition theorem on probability P(AUB) = P(A) +P(B) P(A B) 11. If A and B are mutually exclusive events, Then P(A B) = ɸ Thus P(AUB) = P(A) +P(B). ALL THE BEST JOHN BOSCO PRINCIPAL OF MADRAS VOCATIONAL TRAINING INSTITUTE Madras Vocational Training Institute, 7-19A Cross Street, Lenin Nagar, Ambattur, Chennai 53 madrasvocationaliti@gmail.com Website :

MATHS X STD. Try, try and try again you will succeed atlast. P.THIRU KUMARESA KANI M.A., M.Sc.,B.Ed., (Maths)

MATHS X STD. Try, try and try again you will succeed atlast. P.THIRU KUMARESA KANI M.A., M.Sc.,B.Ed., (Maths) MATHS X STD Try, try and try again you will succeed atlast P.THIRU KUMARESA KANI M.A., M.Sc.,B.Ed., (Maths) Govt.Girls High School,Konganapuram Salem (Dt.) Cell No. 9003450850 Email : kanisivasankari@gmail.com