The value of the composite function (h⁰ g)(x) calculated by function operation is 2x+28 .
A function is described as the relationship between a set's domain and range and its elements. f, g, or h are frequently used to denote functions.
Each element of an algebraic function, denoted by the formula y=g(x), is connected to a single value of x.
(h ∘ g)(x) can also be expressed as h[g(x)] , which signifies that the value of x=g(x) will be replaced in the function h, is referred to as a composite function.
A composite function is produced by combining two existing functions to produce a third, distinct function.
In h of g of x, the output of one function becomes the input of another.
Given functions are:
f(x)=4 x and g(x)=1/2x+7
Therefore (f ∘ g)(x)=f[g(x)]
=f(1/2x+7)
=4×(1/2x+7)
=2x+28
Therefore the value of the function operation (f⁰ g)(x) is 2x+28
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