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#1 2023-11-15 03:53:48
- sologuitar
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Real Solutions of the Quadratic Equation...B
Show that the real solutions of the equation ax^2 + bx + c = 0 are the reciprocals of the real solutions of the equation cx^2 + bx + a = 0. Assume that b^2 - 4ac is greater than or equal to 0.
Any hints? What is the first step to consider?
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#2 2023-11-15 04:20:20
- Bob
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Re: Real Solutions of the Quadratic Equation...B
I've written down the solutions using the quadratic formula, let's say x and x' for the first and y and y' for the second.
To be reciprocals x times y (or maybe y') must equal 1 and similarly x' with y' or y
Haven't tried it yet but I think it should work.
edit: tried it now. It does if you do x times y' (in other words take the plus root for one with the minus root of the other ... then loads of canceling, leaving 4ac/4ac = 1).
Bob
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#3 2023-11-15 04:32:03
- amnkb
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Re: Real Solutions of the Quadratic Equation...B
Show that the real solutions of the equation ax^2 + bx + c = 0 are the reciprocals of the real solutions of the equation cx^2 + bx + a = 0. Assume that b^2 - 4ac is greater than or equal to 0.
Just answer the questions posted and keep your text math-related.
Last edited by amnkb (2023-11-16 18:23:04)
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#4 2023-11-16 18:21:37
- sologuitar
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Re: Real Solutions of the Quadratic Equation...B
I've written down the solutions using the quadratic formula, let's say x and x' for the first and y and y' for the second.
To be reciprocals x times y (or maybe y') must equal 1 and similarly x' with y' or y
Haven't tried it yet but I think it should work.
edit: tried it now. It does if you do x times y' (in other words take the plus root for one with the minus root of the other ... then loads of canceling, leaving 4ac/4ac = 1).
Bob
The wording in this application is horrible.
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#5 2023-11-16 18:24:27
- sologuitar
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Re: Real Solutions of the Quadratic Equation...B
sologuitar wrote:Show that the real solutions of the equation ax^2 + bx + c = 0 are the reciprocals of the real solutions of the equation cx^2 + bx + a = 0. Assume that b^2 - 4ac is greater than or equal to 0.
Just answer the questions posted and keep your text math-related.
Again, what data in the application led you to work out the problem as you did? You said (1/r) is a solution to the quadratic equation given. When you say "a solution", do you mean there are more solutions?
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#6 2023-11-17 17:41:00
- KerimF
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Re: Real Solutions of the Quadratic Equation...B
When you say "a solution", do you mean there are more solutions?
As you know, in general, a quadratic equation has two roots (real or complex) if (b^2 - 4ac) ≠ 0. We may say that 'r' is one of them (for known a, b and c).
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#7 2023-11-18 04:00:19
- sologuitar
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Re: Real Solutions of the Quadratic Equation...B
sologuitar wrote:When you say "a solution", do you mean there are more solutions?
As you know, in general, a quadratic equation has two roots (real or complex) if (b^2 - 4ac) ≠ 0. We may say that 'r' is one of them (for known a, b and c).
Much better this time. Less lectures and philosophy and more mathematics.
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