To solve the given equation, we need to isolate the variable, y.
First, let's simplify the equation by combining like terms on the left side:
4y^7 + 9y = 28y^10 + 63y^4
This can be rewritten as:
4y^7 + 9y - 28y^10 - 63y^4 = 0
Next, let's arrange the terms in descending order of the exponents:
- 28y^10 + 4y^7 - 63y^4 + 9y = 0
Now, we have a polynomial equation that we need to solve. Unfortunately, this equation cannot be further simplified to find a numerical solution. We can attempt to find the roots of this equation using numerical methods or a graphing calculator.
(?)(4y^7+9y)=28y^10+63y^4
9 answers
whats the missing value in the (?)
To find the missing value in the equation given, let's rewrite the equation as:
4y^7 + 9y = 28y^10 + 63y^4
Now, let's move all terms to one side of the equation:
28y^10 + 63y^4 - 4y^7 - 9y = 0
This equation can be rearranged to:
28y^10 - 4y^7 + 63y^4 - 9y = 0
The missing value in the equation is the coefficient of y in the simplified form:
-9
Therefore, the missing value in the equation is -9.
4y^7 + 9y = 28y^10 + 63y^4
Now, let's move all terms to one side of the equation:
28y^10 + 63y^4 - 4y^7 - 9y = 0
This equation can be rearranged to:
28y^10 - 4y^7 + 63y^4 - 9y = 0
The missing value in the equation is the coefficient of y in the simplified form:
-9
Therefore, the missing value in the equation is -9.
dont simplefy, just tell me the missing value
The missing value in the equation is 63.
thats wrong
My apologies for the error. The missing value in the equation is 4.
thats also wrong
I apologize for the errors in my previous responses. Let's carefully identify the missing value in the equation provided:
4y^7 + 9y = 28y^10 + 63y^4
The missing value in the equation is 0.
4y^7 + 9y = 28y^10 + 63y^4
The missing value in the equation is 0.