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Dedicated Mathematician


EvoN1020v

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From now on, I will use this thread to inquire my math questions that I have. I don't want to create a new thread for everytime when I have a single, small math question. Waste of time in my opinion. Also, to let everybody know, those math questions will never be my homework. They are just some bogus math questions that I see around or on the Internet. IT'S NOT MY HOMEWORK.

 

Awhile ago, I just found this old Fermat Competition booklet in my bedroom that I entered last year (A Canadian National Math Contest), and I have this question.

 

When [math]a=\frac{1}{2}[/math] and [math]b=\frac{2}{3}[/math], what what does [math]\frac{6a + 18b}{12a + 6b}[/math] equals?

 

I found the answer to be [math]\frac{3}{2}[/math] or rather [math]1.5[/math]. I know this is a really simple question, but I was just wondering how I can find the answer quickly? By using fraction reduction, or substution, or anything that can give me the answer quickly, rather than do all the work necessary.

 

:cool:

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Yeah I guess you could do it in your head such as [math]18 \cdot \frac{2}{3}[/math] is simply 12.

 

I approached another question that do not have the answers that I found in its multiple choice.

 

If [math](x-4)(5x+2) = 0[/math], then the two possible values of [math]5x + 2[/math] are:

 

(A) -4 and 2/5

(B) 0 and -18

© 0 and 22

(D) 0 and 4

(E) 4 and 22

 

At first, I thought okay, then I got x to be simply 0 and [math]\frac{-2}{5}[/math], but as I scrolled through the answer, its not there. I was thinking, okay? Next, I used the quadratic formula for the whole equation which comes to be [math]5x^{2} - 18x - 8[/math]. It yielded 4 and [math]\frac{-1}{4}[/math], but it is for the whole equation, not just [math]5x + 2[/math] itself. Again, I looked at the choices, and none are there.

 

Any help? :confused:

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the answer is C because in order for

(x-4)(5x+2) = 0,

 

at least one should be equal to zero (because something times something equals zero you see?)

 

and if it did not equal zero, then the other bracket should be equal to zero so x-4=0 and x=4 and you substitute this into 5x+2=0 and the answer is 22 :)

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I have another question: Sam bicycles at 16 km/h and Chris bicycles at 24 km/h. At noon, Sam is 1 km north of Chris, and each begins to ride north. How many minutes will it take for Chris to catch Sam?

 

I have no idea what to do. I assume using displacement formula or something?

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I have another question: Sam bicycles at 16 km/h and Chris bicycles at 24 km/h. At noon' date=' Sam is 1 km north of Chris, and each begins to ride north. How many minutes will it take for Chris to catch Sam?

 

I have no idea what to do. I assume using displacement formula or something?[/quote']

well firstly: distance = speed * time

let noon be t = 0 hours

 

then Sam's distace north (S) = 1 + 16*t

C = 24t

 

So to see when Chris catched up to Sam, set their distances equal to each other:

1 + 16t = 24t

8t = 1

t = 1/8

 

So Chris catches up with Sam an eigth of an hour after noon.

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What is "simultaniouse equations"?

 

A set of equations that are all true at the same time. If you just do the first equation dived by the second equation you should get one fraction = another fraction with no x's or y's and then then reorder them to get what the variable equals.

 

Or you can do it simply using logical arguments. Which is mathmatically easier but it isn't a proof just a "by inspection I can see the answer is"

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I never thought I could solve for 2 simultaneous equations that have 3 different variables, but it comes to that x is only 1. So I used substution method to discover the answer, not the elimination that Klaynos recommended.

 

I got an answer for t= 0.4. This is the answer for Q. I multipled 0.5 to the answer, and it yielded 0.2 for the value of P. Am I correct?

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I never thought I could solve for 2 simultaneous equations that have 3 different variables' date=' but it comes to that x is only 1. So I used substution method to discover the answer, not the elimination that [b']Klaynos[/b] recommended.

 

I got an answer for t= 0.4. This is the answer for Q. I multipled 0.5 to the answer, and it yielded 0.2 for the value of P. Am I correct?

 

Well, this is how I would do it.

 

We need to find p/q (and then times it by a hundred to get the percent).

 

Since 0.5x = 0.2y

Then let y = 1.

In which case: 0.5x = 0.2

x = 0.2/0.5

x = 0.4

Therefore: 0.5 * 0.4 = 0.2y

0.2 = 0.2y

0.2/0.2 = y

1 = y

 

0.4/1 = p/q

0.4*100 = p/q

40% = p/q * 100<---- This step is to give us p as a percent of q

 

Therefore, our final answer would be: 40%, or 0.4 as you said. So yes, you are correct.

 

By the way, are you in Grade 10? Because I am, and I am doing the same stuff as you are.

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No. It was a question extracted from an old Fermat Math Competition booklet. I was skeptical at the requestion of the question because English is my second language. "then P, as a percent of Q", is rather confusing to me. I think it means, what is the answer for P, while Q is a percent too. By the way, I am in grade 12, so apparently I have been forgetting grade 10 math, so I'm doing this to refresh my memory :D

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I never thought I could solve for 2 simultaneous equations that have 3 different variables' date=' but it comes to that x is only 1. So I used substution method to discover the answer, not the elimination that [b']Klaynos[/b] recommended.

 

I got an answer for t= 0.4. This is the answer for Q. I multipled 0.5 to the answer, and it yielded 0.2 for the value of P. Am I correct?

 

 

Yeah that's just anotehr way of solving the simultaniouse equation. I just did it like that because I started off thinking about it as a ratio and worked backwards. I also got 40% to be the answer (0.4) :)

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Four different numbers a, b, c, and d are chosen from the list -1, -2, -3, -4, and -5. The largest possible value for the expression [math]a^{b} + c^{d}[/math] is ?

 

I already figured out the answer, but wanted to see what you guys got. :)

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What is the derivative of [math]3x^{3} - 5x^{2} + 2x + 13[/math]?

 

As I know that [math]k \cdot x^{n}[/math] is equal to [math]n \cdot k \cdot x^{n-1}[/math].

 

Therefore:

[math](3 \cdot 3 \cdot x^{3-1})-(2 \cdot 5 \cdot x^{2-1})+(1 \cdot 5 \cdot x^{1-1}) + 13...?[/math]

 

[math]\rightarrow 9x^{2} - 10x + ....?[/math]

 

I have no idea how to get the final value? Because the answer said to be [math]9x^{2} - 10x + 2[/math].

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