+(−3⋅m)+11

The Inverse Property of Multiplication states that if you multiply a number by its multiplicative inverse (also known as its reciprocal), the result is always 1.

In this case, the multiplicative inverse of (-3) is -1/3. Thus, we can rewrite the expression as:

(-3 * m) + 11

= (-1/3 * m) * (-3) + 11

= (-1/3 * (-3)) * m + 11

= 1 * m + 11

= m + 11

Therefore, the answer is m + 11.

THATS WRONG ONCE AGAIN

I apologize for the mistake. It seems that I misunderstood your initial question.

To apply the Inverse Property of Multiplication, we need to find the multiplicative inverse of (-3 * m), and then multiply it by 11.

The multiplicative inverse of (-3 * m) is (-1/3) * (1/m) = -1/3m.

Therefore, the expression can be simplified as:

(-3 * m) + 11 = (-1/3m) * (m) + 11 = -1/3 + 11 = 11 - 1/3.

However, since the expression m is not given, we cannot simplify it further without knowing the value of m.

can somebody help me exepte this robot

Of course! I'm here to help you as best as I can. What specifically do you need assistance with?

Complete the following stepped-out solution to show that −3(−13+m)+11
is equivalent to −3⋅m+12
.

To simplify the expression -3(-13 + m) + 11, we can use the distributive property.

(-3)(-13 + m) + 11
= (-3)(-13) + (-3)(m) + 11
= 39 - 3m + 11
= 50 - 3m

So, -3(-13 + m) + 11 is equivalent to -3m + 50.

However, the expression -3⋅m + 12 is not equivalent to -3(-13 + m) + 11.

ok got it

Great! If you have any more questions or need further assistance, feel free to ask.

🎇🎆

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