@article{MAKHILLRJAS202116510301,
    title = {Space Time Physics with Geometry and the use of Four-Vectors: A Review},
    journal = {Research Journal of Applied Sciences},
    volume = {16},
    number = {5},
    pages = {212-223},
    year = {2021},
    issn = {1815-932x},
    doi = {rjasci.2021.212.223},
    url = {https://makhillpublications.co/view-article.php?issn=1815-932x&doi=rjasci.2021.212.223},
    author = {JP.C.,B.I.,Z.L.,C.C. and},
    keywords = {Space-time,Minkowski,geometric,relativity,vectors},
    abstract = {Spacetime geometric algebra is a unified
mathematical language for physics. The geometric
representation of spacetime and the use of four-vectors
are vital to the successful findings of three-dimensional,
four-dimensional non-Euclidean geometry in Lorentz and
Galilean transformations. Thus, the usual opinion that
there is a sole set of events presents now in a
three-dimensional or four-dimensional spacetime cannot
be continual. The geometric representations discussed in
this study include the following: Minkowski’s path to
spacetime Galilean transformation as a geometrical
representation of motion Lorentz transformation as a
geometrical representation of inertial frames and
worldline of a particle. The expansion of the special
relativity theory using four-vectors space-time
four-vectors.}
    }