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# How to solve 3 1/4 = 1/2 + x with answer?

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Welcome to my article 3 1/4 = 1/2+x. This question is taken from the simplification lesson.
The solution of this question has been explained in a very simple way by a well-known teacher by doing addition, subtraction, and fractions.
For complete information on how to solve this question 3 1/4 = 1/2+x, read and understand it carefully till the end.

Let us know how to solve this question 3 1/4 = 1/2+x.

First write the question on the page of the notebook

## 3 1/4 = 1/2 + x

We see that mixed fractions are available in the given question. First of all convert this mixed fraction into a simple fraction.

\displaystyle 3\frac{1}{4}=\frac{1}{2}+x

\displaystyle \frac{{4\text{x}3+1}}{4}=\frac{1}{2}+x

\displaystyle \frac{{12+1}}{4}=\frac{1}{2}+x

\displaystyle \frac{{13}}{4}=\frac{1}{2}+x

reverse the numbers

\displaystyle \frac{{13}}{4}-\frac{1}{2}=x

We are seeing that each of these posts are different.
So we solve by finding the least common factor of their denominator.

\displaystyle \frac{{13\text{x}1-1\text{x}2}}{4}=x

\displaystyle \frac{{13-2}}{4}=x

\displaystyle \frac{{11}}{4}=x

Hence the exact solution of this question is 11/4.

example number 1

## 2x^-11x+15=0

\displaystyle 2{{x}^{2}}-11x+15=0

To solve such a problem, the formulas of the quadratic equation \displaystyle a{{x}^{2}}+bx+c=0 compare.
Comparing a=2 , b=-11, c=15
since we know that
D=(b ^2 -4ac )
Where D = Distributed
Now substituting the values of terms in D=(b ^2 -4ac )
[(-11)^2 -4x2x15 ]
121-120
1
Then ,

\displaystyle \sqrt{D}=\sqrt{1}

\displaystyle \sqrt{D}=1

Let the original be \displaystyle \alpha and\beta then \displaystyle \alpha =\frac{{-b=\sqrt{D}}}{{2a}} The formula for \displaystyle \alpha makes sense.

\displaystyle \alpha =\frac{{11+1}}{{2\text{x}2}}

\displaystyle \frac{{12}}{4}

\displaystyle =3

Similarly, extracting the value of \displaystyle \beta gives \displaystyle \beta =\frac{5}{2} .

So the answer to this question is 3 and 5/2

How to solve 3 1/4 = 1/2 + x with answer? This article has been completely solved by tireless effort from our side, still if any error remains in it then definitely write us your opinion in the comment box. If you like or understand the methods of solving all the questions in this article, then send it to your friends who are in need.

Note: If you have any such question, then definitely send it by writing in our comment box to get the answer.
Your question will be answered from our side.

Thank you once again from our side for reading or understanding this article completely.

## Example no 2

\displaystyle \frac{{{{{(3)}}^{{n+4}}}-{{{(6\text{x}3)}}^{{n+1}}}}}{{{{{(3)}}^{{n+2}}}}}

Solve this question as follows

\displaystyle \frac{{{{{(3)}}^{{n+4}}}-{{{(2\text{x}2\text{x}3)}}^{{n+1}}}}}{{{{{(3)}}^{{n+2}}}}}

\displaystyle \frac{{{{{(3)}}^{{n+4}}}-{{{(2\text{x}{{\text{3}}^{2}})}}^{{n+1}}}}}{{{{{(3)}}^{{n+2}}}}}

\displaystyle \frac{{{{{(3)}}^{{n+4}}}-{{{(2\text{x3})}}^{{n+1}}}}}{{{{{(3)}}^{{n+2}}}}}

In this \displaystyle {{{{(\text{3})}}^{{n+1}}}} if required.

\displaystyle \frac{{{{{(3)}}^{{n+4}}}-[{{3}^{2}}\text{2 }!!]!!\text{ }}}{{{{{(3)}}^{{n+2}}}}}

\displaystyle {{{{(3)}}^{{n+2}}}} Delete when down and up.

# HOW TO SOLVE 2 1/4 + 2 1/4 ?

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Welcome to my 2 1/4 + 2 1/4 brainly article. Today we will try to know the complete solution of this question. To know the solution, read the 2 1/4 + 2 1/4 brainly article very carefully.

Let us know how to solve 2 1/4 + 2 1/4 brainly question.

• Taken this question from Simplification chapter. Let’s solve it like this.
• First of all, compound fractions change from simple fractions.
\displaystyle 2\frac{1}{4}+2\frac{1}{4}

\displaystyle \frac{{4\text{x}2+1}}{4}+\frac{{4\text{x}2+1}}{4}

\displaystyle \frac{{8+1}}{4}+\frac{{8+1}}{4}

\displaystyle \frac{9}{4}+\frac{9}{4}

We know that having the same denominator add the numerators together.

\displaystyle \frac{{9+9}}{4}

\displaystyle \frac{{18}}{4}

18/4 can be written as 2×9/2×2.

\displaystyle \frac{{2\text{x}9}}{{2\text{x}2}}

If there is an equal number from the bottom up, the same number is deducted.

So 2 1/4 + 2 1/4 is the correct solution of the question =9/2.

If you liked the article 2 1/4 + 2 1/4 brainly then definitely share it with your friends.

## Look at other similar examples. 9^1/4+7^2/4+6^5/4 ?

This question is taken from Simplification lesson. Convert it to 9^1/4+7^2/4+6^5/4 simple fraction. let’s solve it

\displaystyle 9\frac{1}{4}+7\frac{2}{4}+6\frac{5}{4}

Change in simple fraction —

\displaystyle \frac{{4\text{x}9+1}}{4}+\frac{{4\text{x}7+2}}{4}+\frac{{4\text{x}6+5}}{4}

\displaystyle \frac{{37}}{4}+\frac{{30}}{4}+\frac{{29}}{4}

We know that having the same denominator add up the numerators

\displaystyle \frac{{37+30+29}}{4}

\displaystyle \frac{{96}}{4}

So 9^1/4+7^2/4+6^5/4 the correct solution of the question is 24.

This article has been completely solved by tireless effort from our side, still if any error remains in it then definitely write us your opinion in the comment box. If you like or understand the methods of solving all the questions in this article, then send it to your friends who are in need.

Note: If you have any such question, then definitely send it by writing in our comment box to get the answer.
Your question will be answered from our side.

Thank you once again from our side for reading or understanding this article completely.

# How to solve 2 1/4 + 3/4 brainly ?

1

Welcome to my 2 1/4 + 3/4 brainly article. Today we will try to know the complete solution of this question. To know the solution, read the 2 1/4 + 3/4 brainly article very carefully.

Let us know how to solve2 1/4 + 3/4 brainly question.

\displaystyle 2\frac{1}{4}+\frac{3}{4}

Convert it from a mixed fraction to a simple fraction.

\displaystyle \frac{{4\text{x}2+1}}{4}+\frac{{4\text{x}2+1}}{4}

\displaystyle \frac{{8+1}}{4}+\frac{3}{4}

\displaystyle \frac{9}{4}+\frac{3}{4}

When the denominators are equal, add the numerators together.

\displaystyle \frac{{9+3}}{4}

\displaystyle \frac{{12}}{4}

\displaystyle \frac{{12}}{4}

Having the same number from bottom to top is discarded.

\displaystyle \frac{{4\text{x3}}}{4}

Hence, the correct solution of this question is 3.

If you liked the article 2 1/4 + 3/4 brainly then definitely share it with your friends.

## Look at other similar examples. 7^1/7+8^3/7+9^2/7

This question will be solved in the same way as above.

7^1/7+8^3/7+9^2/7

\displaystyle 7\frac{1}{7}+8\frac{3}{7}+9\frac{2}{7}

Convert it from a mixed fraction to a simple fraction. By doing this the question gets solved easily. The number does not move here and there. Do it like this.

\displaystyle \frac{{7\text{x}7+1}}{7}+\frac{{7\text{x}8+3}}{7}+\frac{{7\text{x}9+2}}{7}

\displaystyle \frac{{50}}{7}+\frac{{59}}{7}+\frac{{65}}{7}

We know that having the same denominator add up the numerators.

\displaystyle \frac{{50+59+65}}{7}

\displaystyle \frac{{174}}{7}

If you understand the solution of 7^1/7+8^3/7+9^2/7, then definitely send it to others [your friends].

# How to solve 1/2 + 1/4 = 3/4 ?

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Welcome to my 1/2 + 1/4 = 3/4 article. Today we will try to know the complete solution of this question. To know the solution, read the 1/2 + 1/4 = 3/4 article very carefully.

Let us know how to solve 1/2 + 1/4 = 3/4 question.

\displaystyle \frac{1}{2}+\frac{1}{4}+\frac{3}{4}

First find the l.c.m of the divisor

\displaystyle \frac{{1\text{x2+1x}1+3\text{x}1}}{4}

\displaystyle \frac{{2+1+3}}{4}

\displaystyle \frac{{3+3}}{4}

\displaystyle \frac{6}{4}