Answer:
The simplified form of the integral is [tex]L=\int\limits^3_0 {\sqrt{17}} \, dx[/tex].
The length of the curve is [tex]L=3\sqrt{17}[/tex]
Step-by-step explanation:
THE ARC LENGTH DEFINITION
If [tex]f'[/tex] is continuous on [tex][a, b][/tex], then the length of the curve [tex]y=f(x)[/tex],[tex]a\leq x\leq b[/tex], is
[tex]L=\int\limits^b_a {\sqrt{1+(\frac{dy}{dx} )^{2} } } \, dx[/tex]
We know that [tex]y = 4x + 2[/tex]; [0, 3]
Applying the above definition we get
[tex]\frac{dy}{dx}=\frac{d}{dx}(4x+2)=\frac{d}{dx}\left(4x\right)+\frac{d}{dx}\left(2\right)=4[/tex]
[tex]L=\int\limits^3_0 {\sqrt{1+(4 )^{2} } } \, dx\\L=\int\limits^3_0 {\sqrt{1+16} } \, dx\\L=\int\limits^3_0 {\sqrt{17}} \, dx[/tex]
[tex]L=\int _0^3\sqrt{17}dx=\left[\sqrt{17}x\right]^3_0=3\sqrt{17}[/tex]
