We need to expand the term:
[tex](5x-2)^6[/tex]This seems like a colossal task, we would need to multiply (5x-2) 6 times. However, we can use a useful tool that is called the 'Pascal's triangle'
I'll paste an image of it above
We will use it in this way:
Each one of the rows, represent the n in the term:
[tex](x+y)^n[/tex]So, if we have the expression (x+y) we will pay attention to the upper row, if we have (x+y)^2 we will need the second row, and so on.
In our case, we need the 6th row.
Now, usually a term of the form
[tex](x+y)^6=ax^6+bx^5y+cx^4y^2+dx^3y^3+ex^2y^4+fxy^5+gy^6[/tex]As we say, look at the 6th row of the triangle, the numbers a, b, c,..., and g are given there!
[tex]\begin{gathered} a=1 \\ b=5 \\ c=10 \\ d=10 \\ e=5 \\ f=1 \end{gathered}[/tex]And we need the term that corresponds to x^2, we need the number e=5!
So, after the expansion, the coefficient of the term x^2 will be equal to 5
