Solve for x, y
x = \frac{33}{7} = 4\frac{5}{7} \approx 4.714285714
y = \frac{50}{7} = 7\frac{1}{7} \approx 7.142857143
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6x-2y=14,-6x+9y=36
To solve a pair of equations using substitution, first solve one of the equations for one of the variables. Then substitute the result for that variable in the other equation.
6x-2y=14
Choose one of the equations and solve it for x by isolating x on the left hand side of the equal sign.
6x=2y+14
Add 2y to both sides of the equation.
x=\frac{1}{6}\left(2y+14\right)
Divide both sides by 6.
x=\frac{1}{3}y+\frac{7}{3}
Multiply \frac{1}{6} times 14+2y.
-6\left(\frac{1}{3}y+\frac{7}{3}\right)+9y=36
Substitute \frac{7+y}{3} for x in the other equation, -6x+9y=36.
-2y-14+9y=36
Multiply -6 times \frac{7+y}{3}.
7y-14=36
Add -2y to 9y.
7y=50
Add 14 to both sides of the equation.
y=\frac{50}{7}
Divide both sides by 7.
x=\frac{1}{3}\times \frac{50}{7}+\frac{7}{3}
Substitute \frac{50}{7} for y in x=\frac{1}{3}y+\frac{7}{3}. Because the resulting equation contains only one variable, you can solve for x directly.
x=\frac{50}{21}+\frac{7}{3}
Multiply \frac{1}{3} times \frac{50}{7} by multiplying numerator times numerator and denominator times denominator. Then reduce the fraction to lowest terms if possible.
x=\frac{33}{7}
Add \frac{7}{3} to \frac{50}{21} by finding a common denominator and adding the numerators. Then reduce the fraction to lowest terms if possible.
x=\frac{33}{7},y=\frac{50}{7}
The system is now solved.
6x-2y=14,-6x+9y=36
Put the equations in standard form and then use matrices to solve the system of equations.
\left(\begin{matrix}6&-2\\-6&9\end{matrix}\right)\left(\begin{matrix}x\\y\end{matrix}\right)=\left(\begin{matrix}14\\36\end{matrix}\right)
Write the equations in matrix form.
inverse(\left(\begin{matrix}6&-2\\-6&9\end{matrix}\right))\left(\begin{matrix}6&-2\\-6&9\end{matrix}\right)\left(\begin{matrix}x\\y\end{matrix}\right)=inverse(\left(\begin{matrix}6&-2\\-6&9\end{matrix}\right))\left(\begin{matrix}14\\36\end{matrix}\right)
Left multiply the equation by the inverse matrix of \left(\begin{matrix}6&-2\\-6&9\end{matrix}\right).
\left(\begin{matrix}1&0\\0&1\end{matrix}\right)\left(\begin{matrix}x\\y\end{matrix}\right)=inverse(\left(\begin{matrix}6&-2\\-6&9\end{matrix}\right))\left(\begin{matrix}14\\36\end{matrix}\right)
The product of a matrix and its inverse is the identity matrix.
\left(\begin{matrix}x\\y\end{matrix}\right)=inverse(\left(\begin{matrix}6&-2\\-6&9\end{matrix}\right))\left(\begin{matrix}14\\36\end{matrix}\right)
Multiply the matrices on the left hand side of the equal sign.
\left(\begin{matrix}x\\y\end{matrix}\right)=\left(\begin{matrix}\frac{9}{6\times 9-\left(-2\left(-6\right)\right)}&-\frac{-2}{6\times 9-\left(-2\left(-6\right)\right)}\\-\frac{-6}{6\times 9-\left(-2\left(-6\right)\right)}&\frac{6}{6\times 9-\left(-2\left(-6\right)\right)}\end{matrix}\right)\left(\begin{matrix}14\\36\end{matrix}\right)
For the 2\times 2 matrix \left(\begin{matrix}a&b\\c&d\end{matrix}\right), the inverse matrix is \left(\begin{matrix}\frac{d}{ad-bc}&\frac{-b}{ad-bc}\\\frac{-c}{ad-bc}&\frac{a}{ad-bc}\end{matrix}\right), so the matrix equation can be rewritten as a matrix multiplication problem.
\left(\begin{matrix}x\\y\end{matrix}\right)=\left(\begin{matrix}\frac{3}{14}&\frac{1}{21}\\\frac{1}{7}&\frac{1}{7}\end{matrix}\right)\left(\begin{matrix}14\\36\end{matrix}\right)
Do the arithmetic.
\left(\begin{matrix}x\\y\end{matrix}\right)=\left(\begin{matrix}\frac{3}{14}\times 14+\frac{1}{21}\times 36\\\frac{1}{7}\times 14+\frac{1}{7}\times 36\end{matrix}\right)
Multiply the matrices.
\left(\begin{matrix}x\\y\end{matrix}\right)=\left(\begin{matrix}\frac{33}{7}\\\frac{50}{7}\end{matrix}\right)
Do the arithmetic.
x=\frac{33}{7},y=\frac{50}{7}
Extract the matrix elements x and y.
6x-2y=14,-6x+9y=36
In order to solve by elimination, coefficients of one of the variables must be the same in both equations so that the variable will cancel out when one equation is subtracted from the other.
-6\times 6x-6\left(-2\right)y=-6\times 14,6\left(-6\right)x+6\times 9y=6\times 36
To make 6x and -6x equal, multiply all terms on each side of the first equation by -6 and all terms on each side of the second by 6.
-36x+12y=-84,-36x+54y=216
Simplify.
-36x+36x+12y-54y=-84-216
Subtract -36x+54y=216 from -36x+12y=-84 by subtracting like terms on each side of the equal sign.
12y-54y=-84-216
Add -36x to 36x. Terms -36x and 36x cancel out, leaving an equation with only one variable that can be solved.
-42y=-84-216
Add 12y to -54y.
-42y=-300
Add -84 to -216.
y=\frac{50}{7}
Divide both sides by -42.
-6x+9\times \frac{50}{7}=36
Substitute \frac{50}{7} for y in -6x+9y=36. Because the resulting equation contains only one variable, you can solve for x directly.
-6x+\frac{450}{7}=36
Multiply 9 times \frac{50}{7}.
-6x=-\frac{198}{7}
Subtract \frac{450}{7} from both sides of the equation.
x=\frac{33}{7}
Divide both sides by -6.
x=\frac{33}{7},y=\frac{50}{7}
The system is now solved.
Examples
Quadratic equation
{ x } ^ { 2 } - 4 x - 5 = 0
Trigonometry
4 \sin \theta \cos \theta = 2 \sin \theta
Linear equation
y = 3x + 4
Arithmetic
699 * 533
Matrix
\left[ \begin{array} { l l } { 2 } & { 3 } \\ { 5 } & { 4 } \end{array} \right] \left[ \begin{array} { l l l } { 2 } & { 0 } & { 3 } \\ { -1 } & { 1 } & { 5 } \end{array} \right]
Simultaneous equation
\left. \begin{cases} { 8x+2y = 46 } \\ { 7x+3y = 47 } \end{cases} \right.
Differentiation
\frac { d } { d x } \frac { ( 3 x ^ { 2 } - 2 ) } { ( x - 5 ) }
Integration
\int _ { 0 } ^ { 1 } x e ^ { - x ^ { 2 } } d x
Limits
\lim _{x \rightarrow-3} \frac{x^{2}-9}{x^{2}+2 x-3}