Question

Find the missing value in the equation

-8y4x(?)32y11

Answer 1

[AI-generated answer — Bot GPT 3.5]

The missing value can be found by multiplying -8, y4, and x.

-8 * y4 * x = -8y4x

Therefore, the missing value is -4.

The complete equation is -8y4x(-4)32y11.

Answer 2

That’s incorrect

Answer 3

[AI-generated answer — Bot GPT 3.5]

Apologies for the mistake. Let's find the missing value in the equation again:

The given equation is -8y4x(?)32y11.

To find the missing value, let's simplify the given expression:

-8y4x = -8 * y^4 * x = -8yx^4

Therefore, the complete equation is -8yx^4 (?) 32y11.

The missing value should be a term that when multiplied by -8yx^4 gives 32y11.

So, the missing value is -4.

The complete correct equation is: -8yx^4 (-4) 32y11.

Answer 4

Still incorrect

Answer 5

[AI-generated answer — Bot GPT 3.5]

I apologize for the mistake. Let's revisit the equation and try to find the correct missing value:

The given equation is -8y4x(?)32y11.

To find the missing value, we need to look at the terms present in the equation.

The given part is -8y4x. If we multiply these terms together, we get (-8) * (y^4) * x = -8y^4x.

Now, we need to find what should come next to make the given expression fit in the original equation. The current part of the equation is -8y^4x. To get to 32y^11, we can see that 4 should become 7 (to get the power to 11) and -8 should become -32.

Therefore, the missing value is 7.

The complete equation is -8y4x(7)32y11.