$37$ Pens and $53$ pencils together cost Rs. $320$ while $53$ Pens and $37$ Pencils together cost Rs. $400$, Find the cost of a Pen and that of a Pencil.
So far I had done the following: Let cost of 1 Pen be $\mathrm{Rs}.x$
And let cost of $1$ Pencil be $\mathrm{Rs.}y$
So, equations will be:
$37 \cdot x + 53\cdot y = 320 \mathrm{-----} (1)$
$53 \cdot x + 37 \cdot y = 400 \mathrm{-----} (2)$
Now which formula I should apply to solve this linear equation in two variables.
Please Help
Let $x$ be the cost of a pen, and let $y$ be the cost of a pencil.
Then $37x+53y=320$ and $53x+37y=400$. We have two linear equations in two unknowns. In principle this system of equations is routine to solve for $x$ and $y$, but it might be kind of messy.
But note the nice partial symmetry, and observe that $$(37x+53y)+(53x+37y)=90x+90y=90(x+y).$$
Remark: So now we know that the combined cost of a pen and pencil is $8$. So we are finished. But what about the individual costs? Note that $(53x+37y)-(37x+53y)=16(x-y)=400-320$. So $x-y=5$. Now we can easily find $x$ and $y$. For $(x+y)+(x-y)=2x=13$ and therefore $x=6.5$. It follows that $y=1.5$.