(?)(5y^4+8y)=15y^6 +24y^3
To solve this equation, we need to simplify the left side of the equation first by multiplying the terms inside the parentheses:
5y^4 + 8y = 5y^4 + 8y
Now we can simplify the right side of the equation by multiplying 15y^2 by 15y^4:
15y^6 + 24y^3 = 15y^6 + 24y^3
Since the left side and right side of the equation are not equal, this equation does not have a solution.
U have to find the missing value (?)(5y^4+8y)=15y^6+24y^3
To find the missing value in the equation, we need to determine what value should be in place of the question mark.
Given equation: ?(5y^4 + 8y) = 15y^6 + 24y^3
We need to simplify both sides of the equation:
On the left side, we have ?(5y^4 + 8y) = ?(5y^4) + ?(8y) = 5?(y^4) + 8?(y) = 5y + 8
On the right side, we have 15y^6 + 24y^3
Now, since both sides of the equation should be equal, we can set up the equation:
5y + 8 = 15y^6 + 24y^3
Now, we need to simplify this equation. Since the terms on both sides are not directly comparable, it seems unlikely that there is a single value that can fit in place of the question mark to make the equation true.
It appears there might have been a mistake in setting up the original equation, or it may be that there are multiple possible values that could fit there.