We are given
[tex]((2x^9)(y^n))((4x^2)(y^{10}))=(8x^{11})(y^{20})[/tex]
Firstly, we simplify left side
Left side is
[tex]((2x^9)(y^n))((4x^2)(y^{10}))[/tex]
we will make all x terms together
and y terms together
[tex](2x^9)(4x^2)(y^n)(y^{10})[/tex]
[tex]2\times 4(x^9)(x^2)(y^n)(y^{10})[/tex]
[tex]8(x^9)(x^2)(y^n)(y^{10})[/tex]
we can multiply left side by using exponent rule
[tex]a^m\times a^n=a^{m+n}[/tex]
[tex]8(x^{9+2})(y^{n+10})[/tex]
[tex]8(x^{11})(y^{n+10})[/tex]
now, we can set them equal
[tex](8x^{11})(y^{n+10})=(8x^{11})(y^{20})[/tex]
Since, both sides have x,y and 8
and both are equal
so, their exponent must be equal
so, exponent of y must also be equal
we get
[tex]n+10=20[/tex]
[tex]n=10[/tex]................Answer
Answer:
n = 10
Step-by-step explanation:
We are given an expression where a power n is unknown.
To find n, we will multiply all the terms at the left side and put them equal to the terms at the right side of the equal sign.
[tex]((2x^9)(y^n)) ((4x^2)(y^{10} )) = (8x^11)(y^20)[/tex]
[tex](2x^9y^n)(4x^2y^{10} ) = 8x^{11} y^{20}[/tex]
[tex]8x^{11} y^{n+10} = 8x^{11} y^{20}[/tex]
Now this is the most simplified form and we can see the same coefficients on each side so will put n+10 equal to its corresponding value.
[tex]n+10 = 20[/tex]
[tex]n = 20-10[/tex]
[tex]n = 10[/tex]
