How do you add $\frac { 5x + 4} { 2x } + \frac { 2x + 1} { 3x }$ ?

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How do you add $\frac { 5x + 4} { 2x } + \frac { 2x + 1} { 3x }$ ?

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Answer 1 · 2017-03-04T02:55:19

See the entire solution process below:

Explanation:

To add fractions the two fractions need to be over common denominators. In this case, we can use a common denominator of $6x$ . To get each fraction over the common denominator of $6x$ we must multiply each fraction by the appropriate form of $1$ :

$(3/3 xx (5x + 4)/(2x)) + (2/2 xx (2x + 1)/(3x))$

$((3(5x + 4))/(3 xx 2x)) + ((2(2x + 1))/(2 xx 3x))$

$((3xx5x) + (3xx4))/(6x) + ((2xx2x) + (2xx1))/(6x)$

$(15x+12)/(6x) + (4x+2)/(6x)$

We can next add the numerators of the two fractions:

$(15x+12 + 4x+2)/(6x)$

We can now group and combine like terms in the numerator:

$(15x + 4x +12+2)/(6x)$

$(19x +14)/(6x)$

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How do you add $\frac { 5x + 4} { 2x } + \frac { 2x + 1} { 3x }$ ?

1 Answer

Explanation:

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1 Answer

Explanation:

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How do you add $\frac { 5x + 4} { 2x } + \frac { 2x + 1} { 3x }$ ?