Math Mastermind

Monday, May 6

How to add Trinomials

Trinomials, a function is in the structure of ax2+bx+c =0 (where a≠0, b, c are constants). Quadratic function or quadratic equation also called trinomials. An algebraic expression which has 3 terms known as trinomials. The product of two binomials gives a trinomial and there are two solutions for the given trinomial. To sum trinomial first it needs to combine the liked terms and then solve it. Since, the trinomial is a combination of two terms and the sum of trinomials also has three terms.

Examples problem for add trinomials:

1. Add trinomials for given function is 2x + 3y + 4z and 6x + 4y +2z.

   Solution:
   Given functions is,
    2x + 3y + 4z and 6x + 4y +2z,

Step 1:
    Write the given trinomials as,
             = 2x + 3y + 4z + 6x + 4y +2z

Step 2:
    Then combine the terms like as,
   = 2x + 6x + 3y + 4y + 4z + 2z

Step 3:
    Then add the given trinomials, and we get the answer,
             Answer = 8x +7y + 6z.

2. Add trinomials for given function is 8x - 2y - 9z and 3x + y +2z.

    Solution:
    Given functions is,
     8x - 2y - 9z and 3x + y +2z,

Step 1:
    Write the given trinomials as,
   = 8x - 2y - 9z + 3x + y +2z

Step 2:
    Then combine the terms like as,
   = 8x + 3x - 2y + y - 9z + 2z

Step 3:
    Then add the given trinomials, and we get the answer,
            Answer = 11x - y - 7z.

Examples problem for add trinomials:

3. Add trinomials for given function is 3x² + 6y² + 4z² and x² + 5y² + 6z².
    Solution:
    Given functions is,
    3x² + 6y² + 4z² and x² + 5y² + 6z²,
Step 1:
    Write the given trinomials as,
   = 3x² + 6y² + 4z² + x² + 5y² + 6z²
Step 2:
    Then combine the terms like as,
   = 3x²+ x² + 6y² +5y² + 4z² + 6z².
Step 3:
    Then add the given trinomials, and we get the answer,
            Answer = 4x² + 11y² + 10z².

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4. Add trinomials for given function is x + y + 4z and 6x + 4y +2z.
    Solution:
    Given functions is,
    x + y + 4z and 6x + 4y +2z,
Step 1:
    Write the given trinomials as,
= x + y + 4z + 6x + 4y +2z
Step 2:
    Then combine the terms like as,
= x + 6x + y + 4y + 4z + 2z
Step 3:
    Then add the given trinomials, and we get the answer,
             Answer = 7x + 5y + 6z.

Sunday, May 5

Sine Cosine Cotangent

Sine:

A trigonometry functions of an angle. The sine of an angle theta shortened as sin theta In a right angled triangle is the ratio of the side opposite angle to the hypotenuse. This definition applies only of angles between 0 to 90 (0 and `pi/2 ` radians).

Sin `theta` = Opposite / hypotenuse = `(BC)/(AC)`

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Cosine:

A trigonometry function of an angle.The cosine of an angle `theta` abbreviated as cos `theta` In a right angled triangle is the ratio of the side adjacent to the hypotenuse.

Cos `theta` = Adjacent / hypotenuse = `(BC)/(AC)`

cotangent:

A trigonometry function of an angle.The cotangent of an angle `theta` ( cot `theta` ) in a right angled triangle is the ratio of the side adjacent to it to the opposite side.
Cot `theta` = adjacent / opposite = `(BC)/(AB)`

Example problem for sin

Find the measure of the length of other sides and also find the sin function values for the given right angle triangle.

we want to find the length of side c, the hypotenuse.

Here, we know that side a has a length of 8 and side b has a length of 6.
To find the length of side c, we can use the Pythagorean Theorem which says that c²=a²+b², or

Substitute in that a=8 and b=6, we find that:

c = √ (( 8²) + (6²))

= √ (64 + 36)

= √ 100

c = 10 m

So the value of x is found as x = 10 m
Now we have to find the value of `theta` . we can use the sin function to find the value of `theta`
Sin `theta` = Opposite / hypotenuse
= 6/10
= 0.6
Sin `theta` = 0.6
`theta` = sin^-1 (0.6)
`theta` = 37^o
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Example problem for cosine, cotangent:

Find the cosine and cotangent function of the given right angled triangle.

Solution:
Here we have to find the cosine and cotangent of the given right angled triangle
Cosine`theta` = Adjacent / hypotenuse
= 4 / 5

= 0.8

cos `theta` = 0.8
`theta` = cos^-1 (0.8)

= 36^o
Cotangent `theta` = adjacent / opposite = 4/3

= 1.33

cot`theta` = 1.33
`theta` = cot^-1 (1.33)

Steps in Data Analysis

Analysis of a data is a process of inspecting, cleaning, transforming, and modeling data with the goal of highlighting useful information, suggesting conclusions, and supporting decision making. Data analysis has been the method of multiple facets and approaches, encompassing diverse techniques under a variety of names, in different business, science, and social science domains. And now we see about the steps in data analysis. (Source -Wikipedia).

I like to share this Define Quantitative Data with you all through my article.

Two tyoes of data analysis are shown below:

Qualitative Analysis types :

The reports are analyzed with the help of given data and that are supported by the qualitative Analysis .

Quantitative Analysis:

The reports are believed in the format of calculating types are called as the quantitative Analysis . And it functions in the order of normal information.
Process in data analysis types:
The some of the process in data analysis types are :

Steps in Data cleaning:

Data cleaning types are the is a main types for the interval of in which the data are experienced, and False data are if important, preferable, and realistic corrected.

Steps in Preliminary Data analysis :

Steps in preliminary data analysis are,

Steps in Quality of Data: Data can be used in a set of types,

Like Histogram, Standard possibility in plotting mean,Average variation,Median

Steps in Quality analysis of size in methods:

The assessment of homogeneity, which provide a deference of the reliability of a component tool

Main steps in data analysis:

The main difference between of the preliminary data analysis and the main analysis are they can get the information’s side by side.

Types in final data analysis :

During the final stage of period , the requirements of the of the preliminary data analysis are predictable.

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Example in Data analysis steps:

Example 1:
Represent the following data in statistical histograms given below
Marks                             No.of students
0 - 5                                        2
5 - 10                                      3
10 - 15                                    4
15 - 20                                    6
20 - 25                                    2
Solution:
Step 1: To mark the class intervals along the x – axis.
              Student marks intervals can be , 0-5, 5-10, 10-15, 15-20, and 20-25.
Step 2: To mark the frequencies along the y – axis.
             Frequencies for number of students are,4,2 , 4, 6 and 2.
               Therefore, the statistical histograms learning to depict the scale in the X-Y plane :
                                    x - axis 1 cm = 5 marks.
                                   y - axis 1 cm = 1 students
Step 3:. Total frequency = 2 + 3 + 4 + 6 + 2 = 17
           And the bar graph are drawn below:

Saturday, May 4

Inverse Correlation Definition

Correlation is a statistical tool which measures the degree and the direction of relationship between two or more variables.Thus correlation is a statistical device which helps us in analysing the covariation of two or more variables.

Types of Correlation

Correlation is described or classified in several different ways. Three of the most important ways of classifying correlation are:
(i) Positive or Negative(Inverse)
(ii)Simple, partial and multiple.
(iii)Linear and non-linear.

Positive and Negative Correlation.
Whether correlation is positive(direct) or negative(inverse) would depend upon the direction of change of the variables. If both the variables are varying in the same direction, i.e., if as one variable is increasing the other on an average is also increasing or, if as one variable is decreasing the other on an average is also decreasing, correlation said to be positive.If, on the other hand, the variables are varying in opposite directions, i.e., as one variable is increasing the other is decreasing or vica-versa, correlation is said to be negative(Inverse).
In other words, when two variables move in the same direction they are said to be positively correlated and when two variables moves in the opposite direction they are said to be negitively correlated.
The following examples would illustrate the difference between positive and negative correlation.

POSITIVE CORRELATION

X :           10        12        15        18        20               X:          80         70         60         40         30
Y     :          15        20        22        25        37               Y:          50         45         30     20 10
2. NEGATIVE(INVERSE) CORRELATION
X :           20        30        40        60        80               X:         100         90         60         40         30
Y     :          40        30        22        15        10               Y:           10         20         30     40 50

Inverse correlation

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In a inverse correlation, as the values of one of the variables increase, the values of the second variable decrease. Likewise, as the value of one of the variables decreases, the value of the other variable increases.

This is still a correlation. It is like an “inverse” correlation. The word “negative” is a label that shows the direction of the correlation.

Here are some other examples of negative correlations:

1. Education and years in jail—people who have more years of education tend to have fewer years in jail (or phrased as people with more years in jail tend to have fewer years of education)

2. Crying and being held—among babies, those who are held more tend to cry less (or phrased as babies who are held less tend to cry more)

Common Factoring Fractions

A common factoring fraction is the important topic in algebra. This method is similar to taking the denominator for comparing two or more fractions. This method is mainly used for following types of problems. They are

Comparing fractions
Adding fractions
Subtracting fractions

In this topic we have to discuss about the common factoring fractions with example problems.

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Brief explanation of common factoring fractions – Comparing Fractions

Comparing fractions:

We can compare two or more fractions; first we can take the common denominator for all fractions. For this we can take the common factors for all denominator values. The type of comparing fractions is mostly used in the following types of problem.

They are

Ascending order
Descending order

Example:

Arrange the following fractions in the ascending order `(1)/(2)` , `(1)/(4)` and `(1)/(8)`

Solution:

Here the denominator values are 2, 4and 8. They are not equal values. So we can take common factor for all denominator values. The common denominator value is 8.

Consider `(1)/(2)` x `(4)/(4)` = `(4)/(8)`

Consider `(1)/(4)` x `(2)/(2)` = `(2)/(8)`

Consider `(1)/(8)`

Now the denominator is same. So we can arrange the fractions in the ascending order in the following manner,`(1)/(8)`,`(2)/(8)`,`(4)/(8)`

Brief explanation of common factoring fractions – Adding and Subtracting Fractions

Adding fractions:

We can add the two or more fractions; first we can take the common denominator for all fractions. For this we can take the common factors for all denominator values. Then we can add the numerator values.

Subtracting fractions:

We can subtract the two or more fractions; first we can take the common denominator for all fractions. For this we can take the common factors for all denominator values. Then we can subtract the numerator values.

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Example:

Simplify the fraction 1/3 + 1/6 -1/12.

Solution:

Here the denominator values are 3, 6 and 12. They are not equal. So we can take common factor for all denominator values. That is 12.

Consider `(1)/(3)` x `(4)/(4)` =`(4)/(12)`

Consider `(1)/(6)` x `(2)/(2)` =`(2)/(12)`

Consider `(1)/(12)`

Now the denominator is same. So we can simplify the numerator values in the following manner,

`((4+2-1))/(12)`= `(5)/(12)`

These are the important types of common factoring fractions.

Friday, May 3

Least Common Multiples by Prime Factorization

The unique factorization theorem says that every positive integer greater than 1 can be written in only one way as a product of prime numbers. The prime numbers can be considered as the atomic elements which, when combined together, make up a composite number. The short term for Least common multiples is LCM. (Source Wikipedia)

Examples for finding Least common multiples by prime factorization:

Example 1:

Find the least common multiples for the numbers 234 and 534 by prime factorization.

Solution:

Prime factorization for the given numbers are

234 : 2 3 3 13

534 : 2 3 89

----------------------------

LCM: 2 3 3 13 89

Least common multiples by prime factorization is 2 * 3 * 3 * 13 * 89 = 20826

Example 2:

Find the least common multiples for the numbers 584 and 564 by prime factorization.

Solution:

584 : 2 2 2 73

564 : 2 2 3 47

------------------------

LCM : 2 2 2 3 73 47

Least common multiples by prime factorization is 2 * 2 * 2 * 3 * 73 * 47 = 82344

Example 3:

Find the least common multiples for the numbers 124 and 164 by prime factorization.

Solution:

124 : 2 2 31

164 : 2 2 41

---------------------

LCM : 2 2 31 41

Least common multiples by prime factorization is 2 * 2 * 31 * 41 = 5084

Example 4:

Find the least common multiples for the numbers 48 and 58 by prime factorization.

Solution:

48 : 2 2 2 2 3

58 : 2 29

------------------------------

LCM : 2 2 2 2 3 29

Least common multiples by prime factorization is 2 * 2 * 2 * 2 * 3 * 29 = 1392

Example 5:

Find the least common multiples for the numbers 45 and 64 by prime factorization.

Solution:

45 : 5 3 3

64 : 2 2 2 2 2 2

-------------------------------------

LCM : 5 3 3 2 2 2 2 2 2

Least common multiples by prime factorization is 5 * 3 * 3 * 2 * 2 * 2 * 2 * 2 * 2= 2880

Practice problems for finding Least common multiples by prime factorization:

Problem 1:

Find the least common multiples for the numbers 56 and 456 by prime factorization.

Least common multiples by prime factorization is 3192

Problem 2:

Find the least common multiples for the numbers 64 and 65 by prime factorization.

Least common multiples by prime factorization is 4160

Problem 3:

Find the least common multiples for the numbers 560 and 4560 by prime factorization.

Least common multiples by prime factorization is 31920

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Problem 4:

Find the least common multiples for the numbers 356 and 78 by prime factorization.

Least common multiples by prime factorization is 13884

Problem 5:

Find the least common multiples for the numbers 4562 and 5697 by prime factorization.

Least common multiples by prime factorization is 25989714

Checking Prime Factorization

Prime number is a number that is divisible by 1 and itself. Prime factorization is nothing but the factorization of a prime numbers. To find the prime factorization of a number the number it factored until all its factors are prime numbers.In this topic we are going to see problems in prime factorization and checking the factors are prime or not. Some example problems are solved below.

Prime Factorization and checking – Example problems:

Find the prime factors of 24 and check?
24 ÷ 2 = 12
12 is not a prime number, so factor again,
12 ÷ 2 = 6
6 is not a prime number, so factor again,
6 ÷ 2 = 3
3 is a prime number,
24 = 2 × 2 × 2 × 3
Checking whether 2,2,2,3 are the prime factors of 24
2 × 2 × 2 × 3 = 24
Therefore 2, 2, 2, 3 are the prime factors of 24
Example 2:
Find the prime factorization of 124 and check ?
124 ÷ 2 = 62
62 is not a prime number, so factor again:
62 ÷ 2 = 31
31 is a prime number.
124 = 2 x 2 x 31
Checking
2 * 2 * 31 = 124
Therefore 2, 2, 31 are the prime factors of 124.

prime factorization tree.
                    124
                      / \
                 2         62
                           /    \
       2    31

Some other examples of prime factorization:

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Example 3:
Find the Prime factor of 81 and check?
Solution:
81 ÷ 9 = 9
9 = 3 * 3
81 = 3 x 3 x 3
Checking
3*3*3 = 81
Therefore the prime factors are 3,3,3
Example 4:
Find the prime factor of 13 and check?
Solution:
39 = 3 x 13
So the prime factor of 19 is 3 and 13.
Checking
3 * 13 = 39
Therefore the prime factors of 31 are 3 * 13.