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Worksheet on numbers from 500 to 599 will help us to practice the numbers from 500 to 599 in orders. 1. Fill in the missing numbers. 2. Write the numbers in words:

Continue reading "Worksheet on Numbers from 500 to 599 | Fill in the Missing Numbers | Answers"

Worksheet on numbers from 400 to 499 will help us to practice the numbers from 400 to 499 in orders. 1. Fill in the missing numbers. 2. Write the standard numeral for the following:

Continue reading "Worksheet on Numbers from 400 to 499 | Fill in the Missing Numbers | Answers"

y = sec x is periodic function. The period of y = sec x is 2π. Therefore, we will draw the graph of y = sec x in the interval [-π, 2π]. For this, we need to take the different values of x at intervals

Continue reading "Graph of y = sec x | Values of sec x|Graph of y = sec x in the Interval [-π, 2π]"

y = csc x is periodic function. The period of y = csc x is 2π. Therefore, we will draw the graph of y = csc x in the interval [-π, 2π]. For this, we need to take the different values of x at intervals

Continue reading "Graph of y = csc x | Values of csc x|Graph of y = csc x in the Interval [-π, 2π]"

Worksheet on numbers from 300 to 399 will help us to practice the numbers from 300 to 399 in orders. 1. Fill in the missing numbers. 2. Write the number words for the following numbers:

Continue reading "Worksheet on Numbers from 300 to 399 | Fill in the Missing Numbers | Answers"

Questions and answers of sample1 for math employment test. 1. If a, b, c, ........, x, y, z are 26 natural numbers , then the value of (x – a) (x – b) (x – c)........ (x – y) (x – z) is:

Continue reading "Answers of Sample1 | Math Employment Test Samples | US Employment Test "

In sample 1 we will find 10 sample questions for math employment test. 1. If a, b, c, ........, x, y, z are 26 natural numbers , then the value of (x – a) (x – b) (x – c)........ (x – y) (x – z) is:

Continue reading "Sample-1 | Math Employment Test Samples | Basic Math Test | Pre-Employment Math"

y = tan x is periodic function. The period of y = tan x is 2π. Therefore, we will draw the graph of y = tan x in the interval [-π, 2π]. For this, we need to take the different values of x at intervals

Continue reading "Graph of y = tan x | Values of tan x|Graph of y = tan x in the Interval [-π, 2π]"

y = sin x is periodic function. The period of y = sin x is 2π. Therefore, we will draw the graph of y = sin x in the interval [-π, 2π]. For this, we need to take the different values of x at intervals

Continue reading "Graph of y = sin x | Values of sin x|Graph of y = sin x in the Interval [-π, 2π]"

y = cos x is periodic function. The period of y = cos x is 2π. Therefore, we will draw the graph of y = cos x in the interval [-π, 2π]. For this, we need to take the different values of x at intervals

Continue reading "Graph of y = cos x | Values of cos x|Graph of y = cos x in the Interval [-π, 2π]"

We know how to draw the graphs of algebraic functions. Now using the same procedure we will learn how to draw the graphs of trigonometrical functions.

Continue reading "Graphs of Trigonometrical Functions |Graphs of the Functions sin x, cos x, tan x"

How to use a number line? 1. Count on a number line and start at 4. Jump to the right by 3. Write the number you land at? First we will draw a number line. Count on a number line and mark the point 4

Continue reading "Use a Number Line | Count on a Number Line | Draw a Number Line"

We will learn how to solve different types of problems on hyperbola. 1. Find the position of the point (6, - 5) relative to the hyperbola x^2/9 - y^2/25 = 1. Solution:

Continue reading "Problems on Hyperbola | Equation of Hyperbola | Transverse Axes of Hyperbola"

Hyperbola formulae will help us to solve different types of problems on hyperbola in co-ordinate geometry. x^2/a^2 - y^2/a^2 =1

Continue reading "Hyperbola Formulae | Problems on Hyperbola | Standard Equations of Hyperbola"

We will learn in the simplest way how to find the parametric equations of the hyperbola. The circle described on the transverse axis of a hyperbola as diameter is called its Auxiliary Circle.

Continue reading "Parametric Equation of the Hyperbola | Auxiliary Circle | Transverse Axis"

What is rectangular hyperbola? When the transverse axis of a hyperbola is equal to its conjugate axis then the hyperbola is called a rectangular or equilateral hyperbola.

Continue reading "What is Rectangular Hyperbola? | Equilateral Hyperbola | Solved Examples"

What is conjugate hyperbola? If the transverse axis and conjugate axis of any hyperbola be respectively the conjugate axis and transverse axis of another hyperbola then the hyperbolas are called the

Continue reading "Conjugate Hyperbola | Transverse Axis and Conjugate Axis "

We know multiplication and division are related to each other. Now we practice the worksheet on multiplication and division by 9 to see how they are related to each other.

Continue reading "Worksheet on Multiplication and Division by 9 |Multiplication Fact|Division Fact"

What is the focal distance of a point on the hyperbola? The sum of the focal distance of any point on a hyperbola is constant and equal to the length of the transverse axis of the hyperbola.

Continue reading "Focal Distance of a Point on the Hyperbola | Focal Distance of any Point"

We know multiplication and division are related to each other. Now we practice the worksheet on multiplication and division by 10 to see how they are related to each other.

Continue reading "Worksheet on Multiplication and Division by 10 |Multiplication and Division Fact"

Worksheet on Multiplication and Division by 8 We know multiplication and division are related to each other. Now we practice the worksheet on multiplication and division by 8 to see

Continue reading "Worksheet on Multiplication and Division by 8 |Multiplication Fact|Division Fact"

We will learn how to find the position of a point with respect to the ellipse. The point P (x1, y1) lies outside, on or inside the hyperbola x^2/a^2 - y^2/b^2 = 1 according

Continue reading "Position of a Point with Respect to the Hyperbola | Solved Examples | Hyperbola"

We will learn how to find the position of a point with respect to the ellipse. The point P (x1, y1) lies outside, on or inside the ellipse x^2/a^2 + y^2/b^2 = 1 according

Continue reading "Position of a Point with Respect to the Ellipse | Solved Examples | Ellipse"

We will discuss about the latus rectum of the hyperbola along with the examples. Definition of the latus rectum of an hyperbola: The chord of the hyperbola through its one focus

Continue reading "Latus Rectum of the Hyperbola | Definition of the Latus Rectum of an Hyperbola"

We know multiplication and division are related to each other. Now we practice the worksheet on multiplication and division by 7 to see how they are related to each other.

Continue reading "Worksheet on Multiplication and Division by 7 |Multiplication Fact|Division Fact"

We know multiplication and division are related to each other. Now we practice the worksheet on multiplication and division by 6 to see how they are related to each other.

Continue reading "Worksheet on Multiplication and Division by 6 |Multiplication Fact|Division Fact"

We will learn how to find the two foci and two directrices of the hyperbola. Let P (x, y) be a point on the ellipse. x^2/a^2 - y^2/b^2 = 1 or, b^2x^2 - a^2y^2 = a^2b^2 Now form the above diagram

Continue reading "Two Foci and Two Directrices of the Hyperbola | A Point on the Hyperbola"

We will discuss about the transverse and conjugate axis of the hyperbola along with the examples. Definition of the transverse axis of the hyperbola: The transverse axis is the axis of a hyperbola

Continue reading "Transverse and Conjugate Axis of the Hyperbola | Length of Transverse Axis"

We will discuss about the centre of the hyperbola along with the examples. The centre of a conic section is a point which bisects every chord passing through it. Definition of the centre

Continue reading "Centre of the Hyperbola |Definition of the Centre of a Hyperbola|Solved Examples"

We know multiplication and division are related to each other. Now we practice the worksheet on multiplication and division by 5 to see how they are related to each other.

Continue reading "Worksheet on Multiplication and Division by 5 |Multiplication Fact|Division Fact"

We know multiplication and division are related to each other. Now we practice the worksheet on multiplication and division by 4 to see how they are related to each other.

Continue reading "Worksheet on Multiplication and Division by 4 |Multiplication Fact|Division Fact"

We will discuss about the vertex of the hyperbola along with the examples. Definition of the vertex of the hyperbola: The vertex is the point of intersection of the line perpendicular

Continue reading "Vertex of the Hyperbola | Definition of the Vertex of a Hyperbola | Hyperbola"

We will learn how to find the standard equation of a hyperbola. Let S be the focus, e (> 1) be the eccentricity and line KZ its directrix of the hyperbola whose equation is required.

Continue reading "Standard Equation of an Hyperbola | Standard Formula of a Hyperbola"

We know multiplication and division are related to each other. Now we practice the worksheet on multiplication and division by 3 to see how they are related to each other.

Continue reading "Worksheet on Multiplication and Division by 3 | Multiplication Table of 3"

We know multiplication and division are related to each other. Now we practice the worksheet on multiplication and division by 2 to see how they are related to each other.

Continue reading "Worksheet on Multiplication and Division by 2 | Multiplication Table of 2"

We will discuss the definition of hyperbola and how to find the equation of the hyperbola whose focus, directrix and eccentricity are given. If a point (P) moves in the plane in such

Continue reading "Definition of Hyperbola | Eccentricity of the Hyperbola | Equation of Hyperbola"

We will learn how to solve different types of problems on ellipse. 1. Find the equation of the ellipse whose eccentricity is 4/5 and axes are along the coordinate axes and with foci at (0, ± 4).

Continue reading "Problems on Ellipse | Equation of Ellipse | Major and Minor Axes of the Ellipse "

What is the focal distance of a point on the ellipse? The sum of the focal distance of any point on an ellipse is constant and equal to the length of the major axis of the ellipse.

Continue reading "Focal Distance of a Point on the Ellipse |Sum of the Focal Distance of any Point"

Ellipse formulae will help us to solve different types of problems on ellipse in co-ordinate geometry. x^2/a ^2 + y^2/b^2 = 1 (a > b) (i) The co-ordinates of the centre are (0, 0).

Continue reading "Ellipse Formulae | Problems on Ellipse | Standard Equations of Ellipse"

We will learn in the simplest way how to find the parametric equations of the ellipse. The circle described on the major axis of an ellipse as diameter is called its Auxiliary Circle.

Continue reading "Parametric Equation of the Ellipse | Major Axis of an Ellipse |Auxiliary Circle "

Does multiplication and division are related? Yes, multiplication and division both are related to each other. A few examples are given are given below to show how they are related to each other.

Continue reading "Multiplication and Division are Related | Multiplication Fact | Division Fact"

Problem solving on division will help us to get the idea on how to solve the basic division statement problems. 1. The teacher brought 36 books from the library. He asked Ron to put them on 3 tables

Continue reading "Problem Solving on Division | Basic Division Statement Problems | Division"

We will discuss about the latus rectum of the ellipse along with the examples. Definition of the latus rectum of an ellipse: The chord of the ellipse through its one focus

Continue reading "Latus Rectum of the Ellipse | Definition of the Latus Rectum of an Ellipse"

We will discuss about the major and minor axes of the ellipse along with the examples. Definition of the major axis of the ellipse: The line-segment joining the vertices of an ellipse is called

Continue reading "Major and Minor Axes of the Ellipse | Definition of Major Axis and Minor Axes"

We will discuss about the centre of the ellipse along with the examples. The centre of a conic section is a point which bisects every chord passing through it. Definition of the centre of the ellipse

Continue reading "Centre of the Ellipse | Definition of the Centre of a Ellipse | Solved Examples"

We will discuss about the vertex of the ellipse along with the examples. Definition of the vertex of the ellipse: The vertex is the point of intersection of the line perpendicular to the directrix

Continue reading "Vertex of the Ellipse |Definition of the Vertex of Ellipse|Vertices of Ellipse"

We will learn how to find the intercepts on the axes made by a circle. The lengths of intercepts made by the circle x^2 + y^2 + 2gx + 2fy + c = 0 with X and Y axes are 2\(\mathrm{\sqrt{g^{2} - c}}\)

Continue reading "Intercepts on the Axes made by a Circle | Equation of the Circle | Examples"

We will learn how to find the position of a point with respect to a circle. A point (x1, y1) lies outside, on or inside a circle S = x^2 + y^2 + 2gx + 2fy + c = 0 according as S1 >= or <0, where S1 =

Continue reading "Position of a Point with Respect to a Circle | Discuss the Positions of Points "

We will learn how to find the equation of a circle through the intersection of two given circles The equation of a family of circles passing through the intersection of the circles

Continue reading "Circle Through the Intersection of Two Circles | Family of Circles | Examples"

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