# Solve equation, strange result

here is my code to solve equation:

``````fx=function(x){ x^3-x-3}
solve=function(a,b,eps){
if(abs(fx(a))<0.00001)  return(list(root=a,fun=fx(a)))
else if(abs(fx(b))<0.00001)  return(list(root=b,fun=fx(b)))
else if (fx(a)*fx(b)>0)  return(list(root="failed to find"))
if (a>b){
c<-a
a<-b
a<-b}
while( b-a>eps ){
x=(a+b)/2
if (fx(x)==0) {return(list(root=x,fun=fx(x))) }
else if (fx(a)*fx(x)<0) {b=x }
else  {a=x}}
myroot=(a+b)/2
return(list(root=myroot,value=fx(myroot)))
}

> solve(1,3,1e-8)
\$root
[1] 1.6717

\$value
[1] 2.674228e-08

> fx(1.6717)
[1] 8.73813e-07
``````

Why `fx(1.6717) != \$value`, I want to know the reason
`8.73813e-07!=2.674228e-08`?

how can i revise:return(list(root=myroot,value=fx(myroot)))
to make my root more digits ?

-

When R prints a value, it uses by default `digits=3`, i.e. printing 3 significant digits. This means you made an error of interpretation when looking at your results.

Try this:

`````` x <- solve(1,3,1e-8)

print(x[[1]], digits=9)
[1] 1.67169989
``````

Now substitute the actual returned value into your function:

``````fx(x[[1]])
[1] 2.674228e-08
``````

Now the values match.

In summary, you have made a rounding error when interpreting the printed results of your function.

You can trace this behaviour in the R help files as follows:

``````?print
``````

will point you to

``````?print.default
``````

Which has this to say about the `digits` argument:

digits: a non-null value for digits specifies the minimum number of significant digits to be printed in values. The default, NULL, uses getOption(digits). (For the interpretation for complex numbers see signif.) Non-integer values will be rounded down, and only values greater than or equal to 1 and no greater than 22 are accepted.

-

Try this and look at the `print()` of `a` and `b`.

``````fx=function(x){ x^3-x-3}
solve=function(a,b,eps){
if(abs(fx(a))<0.00001)  return(list(root=a,fun=fx(a)))
else if(abs(fx(b))<0.00001)  return(list(root=b,fun=fx(b)))
else if (fx(a)*fx(b)>0)  return(list(root="failed to find"))
if (a>b){
c<-a
a<-b
a<-b}
while( b-a>eps ){
x=(a+b)/2
if (fx(x)==0) {return(list(root=x,fun=fx(x))) }
else if (fx(a)*fx(x)<0) {b=x }
else  {a=x}}
myroot=(a+b)/2
print(a,digits=20)
print(b,digits=20)
return(list(root=myroot,value=fx(myroot)))
}
``````

There is a round.

-