Step by Step Solution
Rearrange:
Rearrange the equation by subtracting what is to the right of the equal sign from both sides of the equation :
3*(q-5)-(2*(q^5))=0
Step by step solution :
Step 1 :
Equation at the end of step 1 :
(3 • (q - 5)) - 2q5 = 0
Step 2 :
Equation at the end of step 2 :
3 • (q - 5) - 2q5 = 0
Step 3 :
Step 4 :
Pulling out like terms :
4.1 Pull out like factors :
-2q5 + 3q - 15 = -1 • (2q5 - 3q + 15)
Polynomial Roots Calculator :
4.2 Find roots (zeroes) of : F(q) = 2q5 - 3q + 15
Polynomial Roots Calculator is a set of methods aimed at finding values of q for which F(q)=0
Rational Roots Test is one of the above mentioned tools. It would only find Rational Roots that is numbers q which can be expressed as the quotient of two integers
The Rational Root Theorem states that if a polynomial zeroes for a rational number P/Q then P is a factor of the Trailing Constant and Q is a factor of the Leading Coefficient
In this case, the Leading Coefficient is 2 and the Trailing Constant is 15.
The factor(s) are:
of the Leading Coefficient : 1,2
of the Trailing Constant : 1 ,3 ,5 ,15
Let us test ....
| P | Q | P/Q | F(P/Q) | Divisor | |||||
|---|---|---|---|---|---|---|---|---|---|
| -1 | 1 | -1.00 | 16.00 | ||||||
| -1 | 2 | -0.50 | 16.44 | ||||||
| -3 | 1 | -3.00 | -462.00 | ||||||
| -3 | 2 | -1.50 | 4.31 | ||||||
| -5 | 1 | -5.00 | -6220.00 | ||||||
| -5 | 2 | -2.50 | -172.81 | ||||||
| -15 | 1 | -15.00 | -1518690.00 | ||||||
| -15 | 2 | -7.50 | -47423.44 | ||||||
| 1 | 1 | 1.00 | 14.00 | ||||||
| 1 | 2 | 0.50 | 13.56 | ||||||
| 3 | 1 | 3.00 | 492.00 | ||||||
| 3 | 2 | 1.50 | 25.69 | ||||||
| 5 | 1 | 5.00 | 6250.00 | ||||||
| 5 | 2 | 2.50 | 202.81 | ||||||
| 15 | 1 | 15.00 | 1518720.00 | ||||||
| 15 | 2 | 7.50 | 47453.44 |
Polynomial Roots Calculator found no rational roots
Equation at the end of step 4 :
-2q5 + 3q - 15 = 0
Step 5 :
Equations of order 5 or higher :
5.1 Solve -2q5+3q-15 = 0
Points regarding equations of degree five or higher.
(1) There is no general method (Formula) for solving polynomial equations of degree five or higher.
(2) By the Fundamental theorem of Algebra, if we allow complex numbers, an equation of degree n will have exactly n solutions
(This is if we count double solutions as 2 , triple solutions as 3 and so on
) (3) By the Abel-Ruffini theorem, the solutions can not always be presented in the conventional way using only a finite amount of additions, subtractions, multiplications, divisions or root extractions
(4) If F(x) is a polynomial of odd degree with real coefficients, then the equation F(X)=0 has at least one real solution.
(5) Using methods such as the Bisection Method, real solutions can be approximated to any desired degree of accuracy.
Approximating a root using the Bisection Method :
We now use the Bisection Method to approximate one of the solutions. The Bisection Method is an iterative procedure to approximate a root (Root is another name for a solution of an equation).
The function is F(q) = -2q5 + 3q - 15
At q= -1.00 F(q) is equal to -16.00
At q= -2.00 F(q) is equal to 43.00
Intuitively we feel, and justly so, that since F(q) is negative on one side of the interval, and positive on the other side then, somewhere inside this interval, F(q) is zero
Procedure :
(1) Find a point "Left" where F(Left) < 0
(2) Find a point 'Right' where F(Right) > 0
(3) Compute 'Middle' the middle point of the interval [Left,Right]
(4) Calculate Value = F(Middle)
(5) If Value is close enough to zero goto Step (7)
Else :
If Value < 0 then : Left <- Middle
If Value > 0 then : Right <- Middle
(6) Loop back to Step (3)
(7) Done!! The approximation found is Middle
Follow Middle movements to understand how it works :
Left Value(Left) Right Value(Right) -1.000000000 -16.000000000 -2.000000000 43.000000000 0.000000000 -15.000000000 -2.000000000 43.000000000 -1.000000000 -16.000000000 -2.000000000 43.000000000 -1.500000000 -4.312500000 -2.000000000 43.000000000 -1.500000000 -4.312500000 -1.750000000 12.576171875 -1.500000000 -4.312500000 -1.625000000 2.786926270 -1.562500000 -1.061048508 -1.625000000 2.786926270 -1.562500000 -1.061048508 -1.593750000 0.783857524 -1.578125000 -0.157787284 -1.593750000 0.783857524 -1.578125000 -0.157787284 -1.585937500 0.308165742 -1.578125000 -0.157787284 -1.582031250 0.073980868 -1.580078125 -0.042204180 -1.582031250 0.073980868 -1.580078125 -0.042204180 -1.581054688 0.015812962 -1.580566406 -0.013214437 -1.581054688 0.015812962 -1.580566406 -0.013214437 -1.580810547 0.001294553 -1.580688477 -0.005961119 -1.580810547 0.001294553 -1.580749512 -0.002333577 -1.580810547 0.001294553 -1.580780029 -0.000519586 -1.580810547 0.001294553 -1.580780029 -0.000519586 -1.580795288 0.000387465 -1.580787659 -0.000066065 -1.580795288 0.000387465 -1.580787659 -0.000066065 -1.580791473 0.000160699 -1.580787659 -0.000066065 -1.580789566 0.000047317 -1.580788612 -0.000009374 -1.580789566 0.000047317 -1.580788612 -0.000009374 -1.580789089 0.000018971 -1.580788612 -0.000009374 -1.580788851 0.000004799 -1.580788732 -0.000002288 -1.580788851 0.000004799
Next Middle will get us close enough to zero:
F( -1.580788761 ) is -0.000000516
The desired approximation of the solution is:
q ≓ -1.580788761
Note, ≓ is the approximation symbol
One solution was found :
q ≓ -1.580788761How did we do?
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