Given x=3, the value of the algebraic expression ax to the third power +bx+1 is -2009, and the value of the algebraic expression x=-3 is obtained. Given x=3, the value of the cubic +bx+1 of the algebraic expression ax is -2009, and the value of the algebraic expression x=-3 is obtained.

Given x=3, the value of the algebraic expression ax to the third power +bx+1 is -2009, and the value of the algebraic expression x=-3 is obtained. Given x=3, the value of the cubic +bx+1 of the algebraic expression ax is -2009, and the value of the algebraic expression x=-3 is obtained.

Substitute x=3 into (ax)^3+bx+1=-2009.a^3×3^3+3b+1=-200927a^3+3b=-2010(shift term)3(9a^3+b)=-2010(9a^3+b)=-670 Substitute x=-3 into (ax)^3+bx+1=-2009.a^3×(-3)^3-3b+1-27a^3-3b+1-3(9a^3+b)+1 substitute (9a^3+b)=-670 into the above formula.

Given that a and b are mutually opposite numbers, c and d are mutually reciprocal numbers, m is a negative number whose absolute value is equal to 3, and the value of m2+(cd+a+b) multiplied by m+(-cd) to the power of 2008 is obtained. Given that a and b are mutually opposite numbers, c and d are mutually reciprocal numbers, m is a negative number whose absolute value is equal to 3, and the value of m squared +(cd + a + b) multiplied by m +(-cd) to the obtained.

A, b are mutually opposite numbers, c, d are mutually reciprocal, m is a negative number whose absolute value is equal to 3
A+b=0cd=1m=-3
The value of m2+(cd+a+b) multiplied by m+(-cd) to the 2008 power
2008 Power of =(-3)2+(1+0)*(-3)+(-1)
=9-3+1
=7