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As per my limited knowledge, linear functions have only two variables which define it, namely x and y.
However, as per multivariate linear regression,
h(x)=(theta transpose vector)*(x vector)
where theta transpose vector = (n+1)x1 vector of parameters
x vector = input variables x0, x1, x2 ....., xn
There are multiple variables involved. Does it not change the nature of the graph and consequently the nature of the function itself?
linear functions have only two variables which define it, namely x and y
This is not accurate; the definition of a linear function is a function that is linear in its independent variables.
What you refer to is simply the special case of only one independent variable x, where
y = a*x + b
and the plot in the (x, y) axes is a straight line, hence the historical origin of the term "linear" itself.
In the general case of k independent variables x1, x2, ..., xk, the linear function equation is written as
y = a1*x1 + a2*x2 + ... + ak*xk + b
whose form you can actually recognize immediately as the same with the multiple linear regression equation.
Notice that your use of the term multivariate is also wrong - you actually mean multivariable, i.e. multiple independent variables (x's); the first term means multiple dependent variables (y's):
Note that multivariate regression is distinct from multivariable regression, which has only one dependent variable.
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