Show that the following equation has exactly one real root: 3x+2cosx+5=0

sorrowandsongto

sorrowandsongto

Answered question

2022-10-12

Show that the following equation has exactly one real root:
3 x + 2 cos x + 5 = 0

So I think the way to approach this problem is to use a combination of the intermediate value theorem and the mean value theorem.
But since we are not given a specific interval, I'm not entirely sure what values of f ( a ) and f ( b ) to choose. Am I suppose to choose f ( 0 ) and f ( 1 ) and see that 0 lies in between them. If so, how exactly can we proceed with the mean value theorem after using the intermediate value theorem. Do we have to check for continuity and the number c, or is there some other way?

Answer & Explanation

faux0101d

faux0101d

Beginner2022-10-13Added 21 answers

Let f ( x ) = 3 x + 2 cos x + 5. Then f ( x ) = 3 2 sin x > 0. Thus f is strictly increasing. Then graph of f can intersect the x-axis at most once.Note f is continuous and lim x f ( x ) = and f ( 0 ) = 5 > 0, hence it's graph must intersect the x-axis at least once.
Nikolai Decker

Nikolai Decker

Beginner2022-10-14Added 3 answers

Guide:
Let f ( x ) = 3 x + 2 cos x + 5,
f ( x ) = 3 2 sin ( x ) > 0
Also compute limit of x when x tends to and also .

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