Posted by **Oian** on Friday, March 29, 2013 at 8:23pm.

Every point (x,y) on the curve y=log23x is transferred to a new point by the following translation (x′,y′)=(x+m,y+n), where m and n are integers. The set of (x′,y′) form the curve y=log2(12x−96). What is the value of m+n?

## Answer this Question

## Related Questions

- Trigonometry - Every point (x,y) on the curve y=log(3x)/log2 is transferred to a...
- geometry - ABCD is a parallelogram. Let C′ be a point on AC extended such ...
- physics - Consider the two observers O and O′ at the origins of the ...
- College Physics - Use the relativistic coordinate transformation (x, y, z, t) &#...
- PHY 2054 - Use the relativistic coordinate transformation (x, y, z, t) − (...
- calculus (point me in the right direction please?) - f(x) and f′(x) are ...
- calculus - F.(0) (10 puntos posibles) C1 What is limh→0cos(π...
- calculus - Consider the interval I=[6,7.6]. Break I into four subintervals of ...
- Urgent Calculus Help - Let H(x)=F(G(x)) and J(x)=F(x)/G(x). Suppose F(7)=4, F&#...
- math - f(x) and f′(x) are continuous, differentiable functions that ...

More Related Questions