Compared to 3x g(x) is shifted DOWN 1 unit and shifted RIGHT 2 units
What would you do to f(x) to get to g(x) knowing this?
Compunded quarterly means 8.9% / 4 interest per quarter ...but you need it in DECIMAL form .089/4 = .0225 interest per period (quarter)
then the formula is
FV = PV (1+i)4t FV is FUTURE value PV = PRESENT value ($380) i is the periodic interest calculated above t is years....multiplied x 4 to give the number of periods (quarters)
In ONE year the interest would be like this (1+.02250)4 - 1 = 1.0931 - 1 = .0931 = 9.31 % = APY
Take the smallest nonzero number, subtract it from the other nonzero numbers, repeat until one nonzero number remains, that is the gcd.
We can also use the only euclidean alrgothi you know to solve this conundrum:
gcd(a,b,c)=gcd(gcd(a,b),c)
16.2 = \( 16{2 \over 10}\)=\(\frac{10 \times 16 + 2}{10}=\frac{162}{10}=\frac{81}{5}\)
you can simplify that.
treat it like a fraction
24:30
(x_1,x_2) = (5,-9)
What I did (assuming b is an integer):
By Vieta's formulas
\(-b=x+y\)
\(18=xy\)
and since they are in a ratio of 2 to 1.
Let us pretend Y is the larger solution.
\(2x = y\)
So we substitute.
\(-b=3x\)
\(18=2x^2\)
Solve \(18=2x^2\)
\(9=x^2\)
\(x=3, -3\).
We have \(-b=3x\)
So the largest value should be: \(-b=3(-3)\)
\(b=9\)
By long division, the remainder is x^3 + x.
The possible values of b are 1 and -4.
The possible values of b are 3 and -1.
The possible values of b are 5 and -2.
Oh ok guest.
Why don't YOU answer with the Euclidean algortith then.
The only euclidean algorithm I know could not be used for this.
I sposs I could look it up but since you already know why don't you share with us.
minimum value = t^2 + t/2
Set it where
red paint is 3x
White paint is 2x
3x + 2x = 30
Solve for x.
Then evaluate red paint.
Can you do that?
hint:
24 to 30
Melody this is not the euclidean algorithm
We get minimum when a = b = c = 1/3. Minimum is (1/3)^2 + 2*(1/3)^2 + (1/3)^2 = 4/9.
wait its really just prime factorizing and listing the factors to see which of them are shared?
wow we learned this in school rip I totally forgot.
Find the greatest common divisor of 9118, 12173, and 33182.
Factor(9118) = {2, 47, 97}
Factor(12173) = {7, 37, 47}
Factor(33182) = {2, 47, 353}
Greatest common divisor = 47
It is the only prime factor that they all have in common.
i was editing the postt and i accidentaly deleted the questions, i figured both the answers though . thank you for your help !
I don't understand.
If the angles are all the same then the sides are all the same.
What am I missing?
Thx CPhill
Can you re-write this question so it is legible? How often is compounding? what is the initial amount?
