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31.08.2019 •
Mathematics
How to write 324.5 in number words
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Ответ:
Step-by-step explanation:
three hundred twenty four point five
Ответ:
yes
step-by-step explanation:
we're asked to solve this system of equations:
\begin{aligned} 2y+7x & = -5 5y-7x & = 12 \end{aligned}
2y+7x
5y−7x
=−5
=12
we notice that the first equation has a 7x7x7, x term and the second equation has a -7x−7xminus, 7, x term. these terms will cancel if we add the equations together—that is, we'll eliminate the xxx terms:
2y+7x+ 5y−7x7y+0=−5=12=7
solving for yyy, we get:
\begin{aligned} 7y+0 & =7 7y & =7 y & =\goldd{1} \end{aligned}
7y+0
7y
y
=7
=7
=1
plugging this value back into our first equation, we solve for the other variable:
\begin{aligned} 2y+7x & = -5 2\cdot \goldd{1}+7x & = -5 2+7x& =-5 7x& =-7 x& =\blued{-1} \end{aligned}
2y+7x
2⋅1+7x
2+7x
7x
x
=−5
=−5
=−5
=−7
=−1
the solution to the system is x=\blued{-1}x=−1x, equals, start color blued, minus, 1, end color blued, y=\goldd{1}y=1y, equals, start color goldd, 1, end color goldd.
we can check our solution by plugging these values back into the the original equations. let's try the second equation:
\begin{aligned} 5y-7x & = 12 5\cdot\goldd{1}-7(\blued{-1}) & \stackrel ? = 12 5+7 & = 12 \end{aligned}
5y−7x
5⋅1−7(−1)
5+7
=12
=
?
12
=12
yes, the solution checks out.
if you feel uncertain why this process works, check out this intro video for an in-depth walkthrough.
example 2
we're asked to solve this system of equations:
\begin{aligned} -9y+4x - 20& =0 -7y+16x-80& =0 \end{aligned}
−9y+4x−20
−7y+16x−80
=0
=0
we can multiply the first equation by -4−4minus, 4 to get an equivalent equation that has a \purpled{-16x}−16xstart color purpled, minus, 16, x, end color purpled term. our new (but equivalent! ) system of equations looks like this:
\begin{aligned} 36y\purpled{-16x}+80& =0 -7y+16x-80& =0 \end{aligned}
36y−16x+80
−7y+16x−80
=0
=0
adding the equations to eliminate the xxx terms, we get:
36y−16x+80+ −7y+16x−8029y+0−0=0=0=0
solving for yyy, we get:
\begin{aligned} 29y+0 -0& =0 29y& =0 y& =\goldd 0 \end{aligned}
29y+0−0
29y
y
=0
=0
=0
plugging this value back into our first equation, we solve for the other variable:
\begin{aligned} 36y-16x+80& =0 36\cdot 0-16x+80& =0 -16x+80& =0 -16x& =-80 x& =\blued{5} \end{aligned}
36y−16x+80
36⋅0−16x+80
−16x+80
−16x
x
=0
=0
=0
=−80
=5
the solution to the system is x=\blued{5}x=5x, equals, start color blued, 5, end color blued, y=\goldd{0}y=0y, equals, start color goldd, 0, end color goldd.