We define and investigate a family of Noshiro-Type 
complex-valued harmonic functions of the form $f=h+\bar g$, 
where $h$ and $g$ are analytic in the unit disk $\Delta$. 
A sufficient coefficient condition for these functions 
to be univalent and starlike in $\Delta$ is determined. 
This coefficient condition is shown to be also necessary 
if $h$ has negative and $g$ has positive coefficients. 
Furthermore, distortion theorem, extreme points, 
convolution conditions, and convex combinations 
for this family of harmonic functions are obtained.