How Do You Determine the Number of Solutions for sin(x) = |x|/10?

  • Thread starter Thread starter utkarshakash
  • Start date Start date
AI Thread Summary
To determine the number of solutions for the equation sin(x) = |x|/10, it is suggested to graph both functions. The graph will visually indicate the number of intersections, which represent the solutions. For x > 0, the equation simplifies to 10sin(x) - x = 0, and for x < 0, it becomes 10sin(x) + x = 0. Key considerations include the maximum value of sine, the behavior of |x|/10, and the potential crossings within each sine period. Overall, a graphical approach provides a clear insight into the number of solutions.
utkarshakash
Gold Member
Messages
852
Reaction score
13

Homework Statement


The number of solutions of the equation sin x = |x|/10

Homework Equations



The Attempt at a Solution


When x>0
10sinx-x=0
When x<0
10sinx+x=0

But how do I solve the above equations?
 
Physics news on Phys.org
utkarshakash said:

Homework Statement


The number of solutions of the equation sin x = |x|/10

Homework Equations



The Attempt at a Solution


When x>0
10sinx-x=0
When x<0
10sinx+x=0

But how do I solve the above equations?

Draw a graph of sin(x) and |x|/10; this will tell you the number of solutions, and will also give you a very rough idea of where the solutions lie.
 
IF you only need the number of solutions, and not the solutions themselves, a graph should almost be enough. If you need a little more reasoning, consider:
a) the maximum value of sine
b) the sign of |x|/10
b) the number of possible crossings per sine period.
 
As a useful check, you should be able to see quickly whether the number of solutions with x > 0 is even or odd.
 
Ray Vickson said:
Draw a graph of sin(x) and |x|/10; this will tell you the number of solutions, and will also give you a very rough idea of where the solutions lie.

Thanks
 

Thread 'Finding the number of ways to arrange identical balls in a circle (3 different colors)'

I tried to combine those 2 formulas but it didn't work. I tried using another case where there are 2 red balls and 2 blue balls only so when combining the formula I got ##\frac{(4-1)!}{2!2!}=\frac{3}{2}## which does not make sense. Is there any formula to calculate cyclic permutation of identical objects or I have to do it by listing all the possibilities? Thanks
View full post »

Thread 'Greatest possible value of a constant in polynomial'

Since ##px^9+q## is the factor, then ##x^9=\frac{-q}{p}## will be one of the roots. Let ##f(x)=27x^{18}+bx^9+70##, then: $$27\left(\frac{-q}{p}\right)^2+b\left(\frac{-q}{p}\right)+70=0$$ $$b=27 \frac{q}{p}+70 \frac{p}{q}$$ $$b=\frac{27q^2+70p^2}{pq}$$ From this expression, it looks like there is no greatest value of ##b## because increasing the value of ##p## and ##q## will also increase the value of ##b##. How to find the greatest value of ##b##? Thanks
View full post »

Similar threads

Intersection of a circle and a sine curve
Replies
26
Views
704
Find integer points on this equation
Replies
8
Views
1K
Solving a trigonometric equation with multiples of ##\tan##
Replies
7
Views
2K
Find an equivalent equation involving trig functions
Replies
4
Views
1K
Finding polar equation of a shifted cricle
Replies
6
Views
1K
How many birds of each kind did I buy?
Replies
5
Views
1K
Prove an equation involving inverse circular functions
Replies
6
Views
2K
Solve the equation: ##\tan x ⋅\tan 4x = 1##
Replies
4
Views
2K
Solve for ##x## involving modulus
Replies
10
Views
2K
Are Complex Solutions Overlooked When Solving \(16x^4 = 81\) Directly?
Replies
5
Views
3K

Hot Threads

Recent Insights

Back
Top