Find solutions to non-linear equation

  • Thread starter Thread starter mackhina
  • Start date Start date
  • Tags Tags
    Non-linear
AI Thread Summary
The equation (t-1)^4 + 5 = 3 simplifies to (t-1)^4 = -2, indicating there are no real solutions since a fourth power cannot be negative. This highlights that equations involving even powers cannot yield negative results. Understanding this concept is crucial for efficiently solving similar problems in tests. The discussion emphasizes the importance of recognizing the properties of exponents in determining solution sets. Overall, the equation has no solutions in the realm of real numbers.
mackhina
Messages
8
Reaction score
0
Question:

(t-1)^4+5=3

I know the answer to the question states that there are no solution, but I would like to understand the intuition behind this. If I had this in a test I would waste ages trying to work out why I couldn't solve it.

Any advice would be heaps appreciated.

Thanks

Mick
 
Physics news on Phys.org
mackhina said:
Question:

(t-1)^4+5=3

I know the answer to the question states that there are no solution, but I would like to understand the intuition behind this. If I had this in a test I would waste ages trying to work out why I couldn't solve it.
This equation is equivalent to (same solution set) (t - 1)4 = -2. There are no real numbers that can be raised to the fourth power to result in a negative number, so the solution set is empty.

The same would be true if (t - 1) were raised to any even power.
 
Start solving, you should find out what the reason is quite fast.

Please use the template next time.

Note: there is no solution in R (real numbers), it doesn't mean there is no solution at all.

Edit: beaten by Mark.
 
Thanks for your help Mark, that made it totally obvious. Much appreciated.
 

Thread 'Family of lines that are at a distance of 5 from the origin'

I picked up this problem from the Schaum's series book titled "College Mathematics" by Ayres/Schmidt. It is a solved problem in the book. But what surprised me was that the solution to this problem was given in one line without any explanation. I could, therefore, not understand how the given one-line solution was reached. The one-line solution in the book says: The equation is ##x \cos{\omega} +y \sin{\omega} - 5 = 0##, ##\omega## being the parameter. From my side, the only thing I could...
View full post »

Similar threads

Solving radical equations: Do non-real extraneous solutions exist?
Replies
4
Views
2K
Decompose 4x4 determinant into 24 determinants -- How many are zero?
Replies
1
Views
1K
Determine all the solutions of the system
Replies
19
Views
2K
When is a function linear and when is it affine?
Replies
5
Views
2K
Find integer points on this equation
Replies
8
Views
1K
Solve the following linear system
Replies
21
Views
2K
Number of choosing r non-consecutive numbers out of N natural numbers
Replies
20
Views
3K
Solving an equality with absolute values
Replies
10
Views
2K
Changing the subject of a formula
Replies
16
Views
3K
Investigating Linearity of Event Occurrences Over Time
Replies
1
Views
1K

Hot Threads

Recent Insights

Back
Top