To simplify this expression, we will first distribute the terms inside the parentheses:
(m×m-1)×(m×m×m×m + m×m + 1) - (m×m-1)= m^2 × m^4 + m^2 × m^2 + m^2 - m×m + 1 - m×m + 1
Now, we will simplify further by multiplying the terms:
= m^6 + m^4 + m^2 - m^2 + 1 - m + 1= m^6 + m^4 + m^2 - m + 2
Therefore, the simplified expression is m^6 + m^4 + m^2 - m + 2.
To simplify this expression, we will first distribute the terms inside the parentheses:
(m×m-1)×(m×m×m×m + m×m + 1) - (m×m-1)
= m^2 × m^4 + m^2 × m^2 + m^2 - m×m + 1 - m×m + 1
Now, we will simplify further by multiplying the terms:
= m^6 + m^4 + m^2 - m^2 + 1 - m + 1
= m^6 + m^4 + m^2 - m + 2
Therefore, the simplified expression is m^6 + m^4 + m^2 - m + 2.