When common difference, [tex]d=\sqrt{39}[/tex] then the largest term of these four terms will be [tex]6+3\sqrt{39}[/tex]
Let four consecutive terms of AP is,
[tex]a-3d, a-d, a+d, a+3d[/tex]
Since, sum of all four terms is 24
So, [tex]a-3d+a-d+a+d+a+3d=24\\\\a=6[/tex]
And product is 945
So, [tex](a-3d)(a+3d)(a-d)(a+d)=945\\\\9d^4-360d^2+351=0\\\\d^4-40d^2+39=0\\\\(d^2-1)(d^2-39)=0\\\\d=1,-1\\d=\sqrt{39}, -\sqrt{39}[/tex]
When d= 1, -1 then largest term is 9
When [tex]d=\sqrt{39}, -\sqrt{39}[/tex] then largest term is [tex]6+3\sqrt{39}[/tex]
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