Prelim 2016 Maths Help Thread (1 Viewer)

InteGrand · Jul 31, 2016

Rathin said:
would u then just sub b as (3a+3b) and c as 9ab?
to get x^2-(3a+3b)+9ab? or do we need numerical results?

$\noindent You would need their numerical values. We can find the values of $\alpha +\beta$ and $\alpha \beta$ from the given quadratic equation using its sum and product of roots. Knowing these quantities, we can then find $3\alpha + 3\beta = 3\left(\alpha + \beta\right)$ and $3\alpha \cdot 3\beta = 9\alpha \beta$.$

Green Yoda · Aug 1, 2016

InteGrand said:
$\noindent You would need their numerical values. We can find the values of $\alpha +\beta$ and $\alpha \beta$ from the given quadratic equation using its sum and product of roots. Knowing these quantities, we can then find $3\alpha + 3\beta = 3\left(\alpha + \beta\right)$ and $3\alpha \cdot 3\beta = 9\alpha \beta$.$

I see,
x^2-12x+18?

Green Yoda · Aug 1, 2016

I made a silly mistake in making 3a*3b = 3ab fml but I was on the right track.

Orwell · Aug 1, 2016

InteGrand · Aug 1, 2016

Orwell said:

For the first one, write 4^x as (2^2)^x (as 4 = 2^2) and use index laws.

For the second one, write 2^(2x +1) as 2*(2^(2x)), then let u = 2^x and you'll get a quadratic equation in u, which you can solve via the quadratic formula (or whatever method you like). Once you find the values of u, the values of x are found by recalling that u was 2^x, so x = log₂ u.

Orwell · Aug 1, 2016

Just sat my exam, confident in my receiving of 95%+

Thanks to InteGrand, Rathin, Paradoxica, Drongoski, Jathu and others.

jathu123 · Aug 1, 2016

Orwell said:
Just sat my exam, confident in my receiving of 95%+

Thanks to InteGrand, Rathin, Paradoxica, Drongoski, Jathu and others.

woah congratulations mate! get that top 5 ranking haha

eyeseeyou · Aug 4, 2016

How do you do this question via differentiation first principles:

Find the derivative of y=x^3

Whenever I do it, I keep getting confused

InteGrand · Aug 4, 2016

eyeseeyou said:
How do you do this question via differentiation first principles:

Find the derivative of y=x^3

Whenever I do it, I keep getting confused

$\noindent Let $f(x):= x^3$, then $f(x+h) = (x+h)^3 = x^3 + 3x^2 h + 3xh^2 + h^3$, so $f(x+h) -f(x) = x^3 + 3x^2 h + 3xh^2 + h^3 - x^3 = 3x^2 h + 3xh^2 + h^3$. Hence $\frac{f(x+h)-f(x)}{h} = \frac{3x^2 h + 3xh^2 + h^3}{h} = 3x^2 + 3xh + h^2$, for any $h\neq 0$. Taking the limit as $h\to 0$, we find $f^\prime (x) = 3x^2 + 0 + 0 = 3x^2$.$

pikachu975 · Aug 4, 2016

eyeseeyou said:
How do you do this question via differentiation first principles:

Find the derivative of y=x^3

Whenever I do it, I keep getting confused

f(x) = x^3
f(x+h) = (x+h)^3
= x^3 + 3hx^2 + 3xh^2 + h^3
so basically:
lim x->0 (x^3+3hx^2+3xh^2 + h^3 - x^3) / h
= lim x->0 ( 3hx^2 + 3xh^2 + h^3 ) / h
= lim x->0 3x^2 + 3xh + h^2
sub 0 into h
= 3x^2

EDIT: h-> 0 not x-> 0 for the limit

eyeseeyou · Aug 4, 2016

pikachu975 said:
f(x) = x^3
f(x+h) = (x+h)^3
= x^3 + 3hx^2 + 3xh^2 + h^3
so basically:
lim x->0 (x^3+3hx^2+3xh^2 + h^3 - x^3) / h
= lim x->0 ( 3hx^2 + 3xh^2 + h^3 ) / h
= lim x->0 3x^2 + 3xh + h^2
sub 0 into h
= 3x^2

I'm confused on this???

DatAtarLyfe · Aug 4, 2016

@pikachu975 the limit is actually as h->0. I know thats what you meant since yo let h = 0 in the final line, but make sure you include it in working as its quite critical for first principles

InteGrand · Aug 4, 2016

eyeseeyou said:
I'm confused on this???

That emboldened part was the " – f(x)".

eyeseeyou · Aug 4, 2016

InteGrand said:
That emboldened part was the " – f(x)".

Oh right right

Thanks

Green Yoda · Aug 6, 2016

If (x+1)^2+(y-2)^2=25
What is the length of the intercept cut off by the circle and the x-axis.

I have no idea what to do here..so far I have found the x intercept of the circle at -1+-sqrt(21)

InteGrand · Aug 6, 2016

Rathin said:
If (x+1)^2+(y-2)^2=25
What is the length of the intercept cut off by the circle and the x-axis.

I have no idea what to do here..so far I have found the x intercept of the circle at -1+-sqrt(21)

$\noindent You could try finding the central angle using geometry and then using $\ell = r\theta$.$

Paradoxica · Aug 6, 2016

Rathin said:
If (x+1)^2+(y-2)^2=25
What is the length of the intercept cut off by the circle and the x-axis.

I have no idea what to do here..so far I have found the x intercept of the circle at -1±√21

The length is the greater ordinate minus the lesser ordinate.

that is 2√21, by inspection.

Paradoxica · Aug 6, 2016

InteGrand said:
$\noindent You could try finding the central angle using geometry and then using $\ell = r\theta$.$

is that what that means? I'm confused.

Paradoxica · Aug 6, 2016

Rathin said:
If (x+1)^2+(y-2)^2=25
What is the length of the intercept cut off by the circle and the x-axis.

I have no idea what to do here..so far I have found the x intercept of the circle at -1±√21

If Integrand's interpretation is correct, then using the cosine rule on the angle at the centre,

5² + 5² - (2√21)² = 2(5)(5)cosθ

-17 = 25cosθ

cosθ = -17/25

l = 5cos⁻¹(-17/25)

Green Yoda · Aug 6, 2016

Paradoxica said:
The length is the greater ordinate minus the lesser ordinate.

that is 2√21, by inspection.

Thats the correct answer, I got it anyways thanks

Prelim 2016 Maths Help Thread (1 Viewer)

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