Answer:
Let's denote the two decimal fractions as \(x\) and \(y\).
Given:
1. \(x + y = 1.8\)
2. \(x - y = 0.5\)
We can solve these equations simultaneously to find the values of \(x\) and \(y\).
Adding the two equations:
\(x + y + x - y = 1.8 + 0.5\)
\(2x = 2.3\)
\(x = \frac{2.3}{2} = 1.15\)
Now substituting the value of \(x\) into the equation \(x + y = 1.8\):
\(1.15 + y = 1.8\)
\(y = 1.8 - 1.15\)
\(y = 0.65\)
Therefore, the two decimal fractions are \(1.15\) and \(0.65\) since their sum is \(1.8\) and their difference is \(0.5\).
[tex] \sf{ \color{red}{⊱☆゚Hope \: this \: helps \: uh \: !!}}[/tex]
[tex] \sf{ \color{orange}{ \: ♡⃡ ʈhank \: ᥙᩛou !! .}}[/tex]
[tex] \sf{ \color{yellow}{Answer \: by \: @ɨȶʐʟօʋɛʀɮօʏӼɖ\: }}[/tex]
[tex]{\color{lightgreen}{\underline{\rule{100pt}{2pt}}}}{\color{magenta}{\underline{\rule{100pt}{2pt}}}} [/tex]
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Answers & Comments
Answer:
Let's denote the two decimal fractions as \(x\) and \(y\).
Given:
1. \(x + y = 1.8\)
2. \(x - y = 0.5\)
We can solve these equations simultaneously to find the values of \(x\) and \(y\).
Adding the two equations:
\(x + y + x - y = 1.8 + 0.5\)
\(2x = 2.3\)
\(x = \frac{2.3}{2} = 1.15\)
Now substituting the value of \(x\) into the equation \(x + y = 1.8\):
\(1.15 + y = 1.8\)
\(y = 1.8 - 1.15\)
\(y = 0.65\)
Therefore, the two decimal fractions are \(1.15\) and \(0.65\) since their sum is \(1.8\) and their difference is \(0.5\).
[tex] \sf{ \color{red}{⊱☆゚Hope \: this \: helps \: uh \: !!}}[/tex]
[tex] \sf{ \color{orange}{ \: ♡⃡ ʈhank \: ᥙᩛou !! .}}[/tex]
[tex] \sf{ \color{yellow}{Answer \: by \: @ɨȶʐʟօʋɛʀɮօʏӼɖ\: }}[/tex]
[tex]{\color{lightgreen}{\underline{\rule{100pt}{2pt}}}}{\color{magenta}{\underline{\rule{100pt}{2pt}}}} [/tex]
Answer:
Let's denote the two decimal fractions as \(x\) and \(y\).
Given:
1. \(x + y = 1.8\)
2. \(x - y = 0.5\)
We can solve these equations simultaneously to find the values of \(x\) and \(y\).
Adding the two equations:
\(x + y + x - y = 1.8 + 0.5\)
\(2x = 2.3\)
\(x = \frac{2.3}{2} = 1.15\)
Now substituting the value of \(x\) into the equation \(x + y = 1.8\):
\(1.15 + y = 1.8\)
\(y = 1.8 - 1.15\)
\(y = 0.65\)
Therefore, the two decimal fractions are \(1.15\) and \(0.65\) since their sum is \(1.8\) and their difference is \(0.5\).
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