When solving radical equations like √(3m)/m = 2, two algebraic methods yield different solutions: cross-multiplication and squaring both sides produce m = 0 or m = 3/4, while direct squaring and index laws yield only m = 3/4. The solution m = 0 must be rejected because it creates an undefined expression (0/0) in the original equation, demonstrating that all solutions must be verified against the original equation's domain constraints.
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Hi, everyone.
If you are ready, let me show you the two ways you can solve this problem here.
Solution.
We have the square root of 3 m over m equals 2.
Okay, the first method we're going to apply is to cross multiply because we know that this is over 1.
Yes, we know that this is over 1. So, we are going to have um square root of 3 m to be equal to m multiplied by 2.
And then the square root of 3 m will be equal to 2 m.
Okay, so what again do we do from here?
Very quickly, we are going to square both sides of the equation.
In case you do not know, we are squaring both sides so that the square root here will go.
And if you do that to the right, you have 2 m squared.
Okay. Now, you have to put this um under the square root sign.
Sorry, you have to put this in bracket, right? If not, you will be making a mistake.
For example, if you write this as 2 m squared, it means that the square is for only the m and it has nothing to do with the 2.
Okay, so it will be wrong.
Now, let me remove this so that we can continue.
>> [snorts] >> Right? Now, from here now, this is taking this one out and 3 m is on the left-hand side, which is equal to the square of 2 m, which will give us 4 m squared.
2 squared is 4, and then m squared is um coming down, right?
Remember, this is This can be written like this.
2 squared * m squared. Okay? So, this is what give us this.
>> [snorts] >> Okay, so, we're going to continue from here as we write this one first before this one. So, 4 m squared is equal to 3 m.
But, we'd like to bring them to the same side.
And our 4 m squared - 3 m will be equal to 0.
So, this is now a quadratic equation, and we're going to get two solutions already.
Mind you, m is the only common factor.
Here, now, we're going to have 4 m minus here, m is already out, so we have three, and we equate this to 0.
Okay, so, now, we have m to be equal to 0 or 4 m - 3 to be equal to 0.
Because we have to apply our zero product rule.
Now, m is already 0 or from here, 4 m will be equal to 3.
-3 becomes +3 on the other side.
M here is 0 or from here, we have to divide both sides by four.
This will now go. So, on that side on that side, our M will be equal to 3/4.
Sorry, I wrote out of sight.
So, to conclude, we have our M to be 0 or 3/4.
But, the question now is are we really expecting two solutions for the equation?
Let's apply the second method, and then we will know whether to agree with the two solutions or not.
Okay, you have to stay for the second method because it's going to be faster and easier for you.
Right?
We have the square root of 3M over M squared.
Okay, just M.
Right? And it's equal to two.
So, what do we do?
Our first target now is to remove the square root.
And to remove the square root, we have to square both sides of the equation.
Yes.
Without cross multiplying, let's square the both sides of the equation.
So, we have square root of 3M over M the whole of this will be squared.
And then, we have two squared on the other side.
Right? I think this is very, very easy.
And [snorts] from one of the laws of indices that we know if you have A over B all squared this can be written as A squared over B squared, right?
Okay, so let me remove this.
Okay, so the same thing will be applicable here now. We can write this as square root of 3 m squared over m squared.
And this is equal to 4 on the other side.
So, this can just take this out.
And over there we have 3 m left.
And it's over m squared.
This is equal to 4.
Now, we are not going to cross multiply.
If we cross multiply, it will give us exactly what the first method gave us.
So, we will not cross multiply, but we can do something here.
From here we can write this as m.
Okay, 3 into m over m squared.
And this is equal to 4. So, from here now we can easily we can easily cancel out one of the m.
Right? Because this has power of 1. And from one of the laws of indices, we pick one of the bases.
So, we have 3.
We pick one of the bases, which is m.
Then we have 1 minus 2.
And this is equal to 4, right?
This is interesting.
Very interesting. So, to continue, we have 3 m to the power of negative 1.
Because 1 minus 2 is negative 1.
As it is equal to 4.
And from here again, we're looking for the value of m. So, we can easily take out this 3 from here as we divide 3 by 3 and divide 4 by 3.
Right? So, this will enable us to have only m on the left-hand side.
Okay, so we will continue from here so that we have m to the power of 1 to be equal to 4 over 3.
But, what do you notice? We have m to the power of 1. From one of the laws of indices, too, this is 1 over m being equal to 4 over 3.
And we're looking for m alone, so we'll have to take the reciprocal of this, which will give us m over 1. m over 1 is the same thing as m.
And is equal to the reciprocal of this, which is 3 over 4.
So, this is the value of m.
And remember that the first solution, I mean the first method, gave us two solutions.
We got m to be 0 or 3 over 4.
But, the second method is giving us only one solution.
Now, do you think the two solutions from the first method will satisfy the equation?
Look at the equation again. Square root of 3m over m equals um 2.
Okay, so the first um solution gave us um a solution which we have to reject because m cannot be equal to 0.
Yes, if you put m to be 0, then you're going to have 0 over 0, and 0 over 0 cannot give you 2.
As a matter of fact, it's undefined.
So, to conclude to conclude this, m equals 0 will be rejected, and m equals 3 over 4 is the only solution.
Thank you for watching.
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