prove 2/7 – 3/5 not equal to 3/5 – 2/7 no spam correct answer will give 100 thanks About the author Ava
[tex] \huge \mathfrak \pink{Answer}[/tex] There are 2 ways to solve the above equation: 1st Way: If we need the desired output in decimal point then, by using the BODMAS method will divide the values: 3/5 = 0.6 and 2/7 = 0.286(approx) So the output of the above equation = 0.6 + 0.286 = 0.886 2nd Way: If we need the desired output in fraction format then, will find the LCM of both denominators 5 and 7 LCM of 5 and 7 = 35 So the equation 3/5 + 2/7 can be written as = [(3*7)/35 + (2*5)/35] = [21/35 +10/35] So the output of above equation – 31/35 Reply
[tex] \frac{2}{7} – \frac{3}{5} \cancel{ = } \frac{3}{5} – \frac{2}{7} \\ \frac{10 – 21}{35} \cancel{ = } \frac{21 – 10}{35} \\ \frac{ – 11}{35} \cancel{ = } \frac{11}{35} \\ \\ there \: is \\ \: diff \: of \: \frac{22}{35} in \: them[/tex] Reply
[tex] \huge \mathfrak \pink{Answer}[/tex]
There are 2 ways to solve the above equation:
1st Way: If we need the desired output in decimal point then, by using the BODMAS method will divide the values:
3/5 = 0.6 and 2/7 = 0.286(approx)
So the output of the above equation = 0.6 + 0.286 = 0.886
2nd Way: If we need the desired output in fraction format then, will find the LCM of both denominators 5 and 7
LCM of 5 and 7 = 35
So the equation 3/5 + 2/7 can be written as
= [(3*7)/35 + (2*5)/35]
= [21/35 +10/35]
So the output of above equation – 31/35
[tex] \frac{2}{7} – \frac{3}{5} \cancel{ = } \frac{3}{5} – \frac{2}{7} \\ \frac{10 – 21}{35} \cancel{ = } \frac{21 – 10}{35} \\ \frac{ – 11}{35} \cancel{ = } \frac{11}{35} \\ \\ there \: is \\ \: diff \: of \: \frac{22}{35} in \: them[/tex]