Asked by sara
the equation x^3 -x-5=0 has one solution for x between -2 and 2. what is the solution?
how do I get this
how do I get this
Answers
Answered by
Damon
The only real root is x = 1.0416
http://www.mathportal.org/calculators/polynomials-solvers/polynomial-roots-calculator.php
http://www.mathportal.org/calculators/polynomials-solvers/polynomial-roots-calculator.php
Answered by
Damon
1.90416
Answered by
sara
how do you get that without using a calc?
Answered by
sara
I am also having trouble with this problem
for a differentiable function it is known that f(3)=5 and f'(3)=-2 use differentials to get the approx. value of f(3.02)
for a differentiable function it is known that f(3)=5 and f'(3)=-2 use differentials to get the approx. value of f(3.02)
Answered by
bobpursley
I can do better than that. its between 1 and 2. Ever hear of the intermediate value theorem?
looking at 1.8=x
then it is still negative (y=x^3-x+5), so it is now between 1.8 and 2
looking at 1.9, same logic, it is now bounded by 1.9<x<2.0
now looking at 1.95, it is positive, so the 1.9<x<1.95, positive, 1.9<x<1.93
looking at x=1.92, too high
looking at x=1.91, too high
looking at x=1.905, a hair to high
looking at x=1.9042, that is really close. How accurate do you want it.
Check out the intermediate value theorem, and Newton's method (more complicated by hand).
looking at 1.8=x
then it is still negative (y=x^3-x+5), so it is now between 1.8 and 2
looking at 1.9, same logic, it is now bounded by 1.9<x<2.0
now looking at 1.95, it is positive, so the 1.9<x<1.95, positive, 1.9<x<1.93
looking at x=1.92, too high
looking at x=1.91, too high
looking at x=1.905, a hair to high
looking at x=1.9042, that is really close. How accurate do you want it.
Check out the intermediate value theorem, and Newton's method (more complicated by hand).
Answered by
Damon
Did you click on the polynomial calc link?
You can use Newton's method.
I will give you a link in a minute.
Oh, no need, this next problem is in fact Newton's method.
Draw a sketch
f(3) = 5
Put an x at (3,5)
slope ay (3,5) = -2
f(x+dx) = f(x) + slope * dx
f(3 + .02) = f(3) -2 (.02)
f(3.02) = 5 -.04
= 4.96
Now back to the earlier problem which is this same trick in a minute
You can use Newton's method.
I will give you a link in a minute.
Oh, no need, this next problem is in fact Newton's method.
Draw a sketch
f(3) = 5
Put an x at (3,5)
slope ay (3,5) = -2
f(x+dx) = f(x) + slope * dx
f(3 + .02) = f(3) -2 (.02)
f(3.02) = 5 -.04
= 4.96
Now back to the earlier problem which is this same trick in a minute
Answered by
Damon
Newton's method for finding zeros
f(x) = x^3 -x-5
pick an x in the range, say x = 2
f(2) = 1
f'(2) = 3 x^2 - 1 = 11
mark that point (2,1) and slope of 11 through it
now that slope will hit the x axis at
x + y / dy/dx
or
2 + (-1)/11 = 1.909
now repeat again and again until you
converge
f(1.909) =
f'(1.909 ) = etc
f(x) = x^3 -x-5
pick an x in the range, say x = 2
f(2) = 1
f'(2) = 3 x^2 - 1 = 11
mark that point (2,1) and slope of 11 through it
now that slope will hit the x axis at
x + y / dy/dx
or
2 + (-1)/11 = 1.909
now repeat again and again until you
converge
f(1.909) =
f'(1.909 ) = etc
Answered by
Damon
sorry, x - y / dy/dx
Answered by
Damon
http://archives.math.utk.edu/visual.calculus/3/newton.5/
There are no AI answers yet. The ability to request AI answers is coming soon!
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.