Samuel needs to mail a package to hi friend in New York. He places an address label with length represented by the function l(x)=3x^3 + 2x^2 - 4x +5 and width represented by the function w(x)=x+2. What is true about the label?
A(x)=l(x)+w(x)
the resulting polynomial for A(x) will be a 4th degree polynomial
l(x)= A(x)/w(x)
The resulting polynomial for A9x) will have a leading coefficient of 6
A(x)- l(x)* w(x)
The resulting polynomial for A(x) will be a higher degree polynomial than either l(x) or w(x). However, without knowing the specific values of x, it is not possible to determine if A(x) will be a 4th degree polynomial.
l(x) = A(x)/w(x) indicates that the length of the label is equal to the area of the label divided by the width. This equation does not provide any information about the degree of the resulting polynomial.
The resulting polynomial for A(x) will have a leading coefficient that depends on the specific values of x and the coefficients of l(x) and w(x). It is not possible to determine if the leading coefficient will be 6 without more information.
A(x) - l(x) * w(x) is not a valid equation. It seems to be missing an equals sign or another operator, so it is not possible to determine any truths about it.