The multiplicative inverse of 5y -xy + 1 is 1/5y -xy + 1
The additive inverse of 5y - xy + 1 is -5y + xy - 1
Thanks to the browser, it is not possible to tell what the inequalities are.
The expression ( y2x + (-3) ) simplifies to ( y2x - 3 ). Here, ( y2x ) represents the term involving the variables ( y ) and ( x ), while ( -3 ) is a constant. Thus, the overall expression combines a variable term and a constant.
the inverse of x+3
If you mean: y = x^2+4x+3 and y = 2x+6 Then the solution is: x = 1 or x = -3
Multiplicate inverse of -3 is - 1/3.
Thanks to the browser, it is not possible to tell what the inequalities are.
The multiplicative inverse of 3+2x is 1/(3+2x).
the inverse of x+3
The reciprocal (multiplicative inverse) of -3 is -1/3.The reciprocal (multiplicative inverse) of -3 is -1/3.The reciprocal (multiplicative inverse) of -3 is -1/3.The reciprocal (multiplicative inverse) of -3 is -1/3.
If you mean: y = x^2+4x+3 and y = 2x+6 Then the solution is: x = 1 or x = -3
The inverse of 3 is 1/3.
Multiplicate inverse of -3 is - 1/3.
The additive inverse of a number is what you would add to that number to get zero. For 3, the additive inverse is -3. The multiplicative inverse is what you would multiply by to get one; for 3, the multiplicative inverse is ( \frac{1}{3} ). Thus, the additive inverse of 3 is -3, and the multiplicative inverse is ( \frac{1}{3} ).
The multiplicative inverse of -3 is -(1/3) or negative one-third. The multiplicative inverse of a number is the number that you multiply it by to get a result of 1 (the multiplicative identity). So, since -3 times -(1/3) is 1, -(1/3) is the multiplicative inverse of -3. Similarly, +3 is the ADDITIVE inverse of -3. The additive inverse of a number is the number you add to it to get a result of 0 (the additive identity). So, since -3 + (+3) = 0, +3 is the additive inverse of -3. The original answer given here was that the multiplicative inverse of -3 is +3, which is flat incorrect.
Additive Inverse
The multiplicative inverse of 3 1/12 is 12/37.
The inverse of negative 3, when considering additive inverse, is positive 3, because adding the two together yields zero. If considering multiplicative inverse, it would be (-\frac{1}{3}), as multiplying negative 3 by (-\frac{1}{3}) results in -1. The context determines which type of inverse is being referred to.