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Friday, December 28, 2012

Interjection and its types


Interjection is one of the eight parts of speech in English grammar along with noun, pronoun, verb, adverb, adjective, conjunction and preposition. Interjection is a part of speech that conveys emotions or expresses a meaning or feelings. Interjection does not add meaning to a sentence but express the feeling of the speaker. An interjection is sometimes followed by the exclamation sign i.e. “!”. For example: The kid exclaimed, “Hurrah! I got Barbie coloring pack of pens”. Here, the interjection “hurrah!” is expressing the excitement of the kid after getting Barbie coloring pack of pens. There are five different types of interjections classified based on expressions such as greetings, joy, approval, surprise and grief. Lets’ have a closer look at each of the types of interjections.

Interjections to express Greetings:
Interjections to express greetings are type of interjections that are used to wish someone. Popularly used interjections of expressing greetings are: hello, hi and so on. For example: Hello, how have you been? Here, the speaker is wishing hello and how the other person has been by using “hello”.

Interjections to express Joy:
As the term suggests, these types of interjections convey the feeling of joy and excitement of the speaker. Commonly used interjections are: hurrah, yippee, hey and more. For example: Hey! Look Farlin India collection has real good stuffs for kids. Here, the speaker is expressing his excitement at Farlin India brand’s grand collection.

Interjections to express Approval:
Interjections to express approval are used to express or congratulate on someone’s effort. Commonly used interjections of expressing approval are: bravo, wow etc. For example: Bravo! You won the match. Here, the speaker is congratulating some for winning the match.

Interjections to express Surprise:
Interjections to express surprise are used to express the emotion of surprise by the speaker. Commonly used interjections of expressing surprise are: oh, eh and so on. For example: Oh! Nuby baby brand is giving away annual sale this month. Here, the speaker is expressing his surprise at Nuby baby brand’s annual discount.

Interjections to express Grief:
Interjections to express grief as the term describes is used to express sorrow or grief by the speaker. Commonly used interjections expressing grief are: alas, ouch and more. For example: Alas! The man is dead. Here, the speaker is using “Alas” to express his grief on the man’s death.

Tuesday, December 18, 2012

Set Theory and Various Types of Sets



Set theory is one of the important theories in mathematics. It can help in solving of various mathematical problems. The problems can be represented in the graphical form with the help of set theory. A set is nothing but a collection of objects. There can be intersection of sets and union of sets. On performing the intersection operation the common elements of both the sets are got. The union of two sets gives all the elements present in both the sets. Basically a set can consist of various objects in it. But usually in mathematics sets usually deal with the objects which are related to mathematics.

The concept of set theory is very ancient. In the 1870’s itself good research was done on this topic and considerable progress was made. A Venn diagram is best used to represent the operations on sets. The process of intersection and union can be easily represented on the Venn diagram. There can be bigger set and a smaller which is part of it is called its subset. This can be explained with the help of an example. If a set contains the elements {1, 2, 3, 4} and there is another set which contains the elements {1, 2} then the latter set is subset of the former set. It simply means the all the elements present in the second set are also present in the first set. First set covers the whole of the second set in it.

The compliment of a set is nothing but a set containing elements which are present in the universal set but are not present in the given set. The set complement can be explained with the help of an example. If there are elements like {a, b, c, d, e} in the universal set and elements in the given set whose compliment is to be found out, are {a, c, e} then the complement set is given by { b, d}. So, the elements b, d is contained in the universal set but is not present in the set whose compliment has to be found. So, these elements are part of the required set. The compliment of a set X can be represented by the notation X’. This is a simple notation and there is another method of representing the same. Instead of the apostrophe symbol the letter ‘c’ can also be used to represent compliment.

Friday, December 7, 2012

Introduction to polygon basics



The polygon is a basically called plane figure and that is surrounded with closed path, collected of a fixed series in straight line segments with a nearer polygonal chain. And these segments are called its edges or sides. Let us discuss  the topic called polygon basics. (Source – Wikipedia)

Types of Polygon Basics

Names of polygons basics with different number of sides:

  • Triangle : Triangle consists of three sides
  • Quadrilateral :Quadrilateral consists of four sides
  • Pentagon: Pentagon consists of five sides
  • Hexagon:Hexagon consists of six sides
  • Octagon:Octagon consist of eight sides.
  • Nanogon : Nonagon consists of nine sides
  • Decagon : Decagon consists of ten sides
  • Heptagon:Heptagon consists of sevensides.
  • Triskaidecagon or Tridecagon : Trikaidecagon or tridecagon consists of  thirteen sides. 

  • Tetrakaidecagon or Tetradecagon : Tetrakaidecagon or tetradecagon consists of fourteen sides.
  • Pendedecagon : Pendedecagon consists of fifteen sides.
  • Hexdecagon: Texdecagon consists of  sixteen sides.
  • Heptdecagon: Heptdecagon seventeen sides.
  • Octdecagon: Octdecagon eighteen sides.
  • Enneadecagon: Enneadecagon consists of nineteen sides
  • Icosagon: Icosagon consists of twenty sides.
  • Triacontagon : Triacontagon consists of thirty sides.
  • Teracontagon: Teracontagon consists of forty sides.
  • Tetracontagon: Tetracontagon consists of fifty sides.
  • Pentacontagon: Tentacontagon consists of sixty sides.

 The triangle is the basic method in polygon and it has three angles. This involves three sides and three vertices.

 Triangle


Square


The octagon




The drawn diagramatic representation are the  basics form in polygon.

Problems Based on Polygon Basics

Example 1 :

Determine the side distance end to end of hexagon is 12 cm. Mention the area of the hexagon.

Solution:

            Given:

                        Side distances  (t) = 12 cm

            Formula:

                        Area of the hexagon (A) = t2 2.6

                                                = 122 x 2.6

                                                = 144 x 2.6

                                                = 374.4

Example 2:

The side distances of hexagon is 13cm. Find the area of the hexagon.

Solution:

            Given:

                        Side length (t) = 13 cm

            Formula:

                        Area of the hexagon (A) = t2 2.6

                                                = 132 x 2.6

                                                = 169 x 2.6

                                                = 439.4

              Area of the hexagon = 439.4 cm2    

Tuesday, December 4, 2012

Real numbers



Real Number Definition– As the name says “Real”, so these numbers are actually numbers that really exists. Any number that we think of is considered as a real num, be it positive or negative, fraction or decimal. Real num. are numbers those includes both rational and irrational number. A real-number has to have a value. If there is no value to any number then we can call that number as an imaginary number. All integers like -75, 89, and 84 etc. are considered as real num. All fractions like 3/5, 7/2, -9/7 are considered as real no. too.

Decimals along with repeating decimals are also considered as real num.
These can be any positive or negative number. We can plot All Real Numbers on the number line too.  Therefore we can order these numbers and that we cannot do in case of imaginary numbers. The name of imaginary numbers itself says that they are imaginary so we can just imagine them; they do not have a specified value. These numbers can be plotted the same way we plot the integers that is smaller numbers on left and larger numbers on right. So greater the number, more it will be towards right side of number line.
So we can call real nos. as all those numbers which are present on number line are termed as such.
Some Real Numbers Examples are pi, 34/7, 5.676767, -1034, 45.87 etc.
Some examples of imaginary numbers are square root of -34 or square root of -2, as there is a negative under the root, so the value of this number cannot be found.

Similarly value of infinity cannot be determined too .
Hence these numbers are not considered as real and are considered as an imaginary numbers. So these numbers are all integers, fractions decimals and repeating decimals numbers. We can add, subtract, multiply and divide real nos. just like another numbers. We can perform the operations on real-numbers same way as we do them on other numbers.

Now the question arises that Is 0 a Real Number– Zero is considered as an integer and all integers are real-numbers. Therefore zero is considered to be as a real-number.
 All Real Numbers Symbol is R which is used by many mathematicians. The symbol R is used to represent the set of real nos. All such numbers can be seen on the number line but we cannot find imaginary numbers on that.