Quick math question? (1 Viewer)

Zokunu · Sep 19, 2013

Differentiate f(x) = √x+2 from first principle.

Ok, here is what I got at the end...

1/h x h/√(x+h)+2 + √x+2

The answer is 1/2√x+2 . But how?

Thanks.

Carrotsticks · Sep 19, 2013

You can now let h -> 0, after cancelling some of them.

Zokunu · Sep 19, 2013

Carrotsticks said:
You can now let h -> 0, after cancelling some of them.

this?

1/√(x+0)+2 +Vx+2 ?

Carrotsticks · Sep 19, 2013

You are missing a lot of brackets, which makes it confusing. Is this your expression?

$\frac{1}{h} \times \frac{h}{\sqrt{x+h+2}+\sqrt{x+2}}$

Zokunu · Sep 19, 2013

Carrotsticks said:
You are missing a lot of brackets, which makes it confusing. Is this your expression?

$\frac{1}{h} \times \frac{h}{\sqrt{x+h+2}+\sqrt{x+2}}$

mhm, ye

Carrotsticks · Sep 19, 2013

Remember, differentiation by first principles has a lim as h->0 at the front. If we cancel the H in the denominator and numerator, and then let H->0, we get the required expression.

Zokunu · Sep 19, 2013

Carrotsticks said:
Remember, differentiation by first principles has a lim as h->0 at the front. If we cancel the H in the denominator and numerator, and then let H->0, we get the required expression.

1/√x+2 + √x+2
1/2√x+2

Thanks man

Menomaths · Sep 19, 2013

$\frac{1}{h} \times \frac{h}{\sqrt{x+h+2}+\sqrt{x+2}}$

$= \frac{1}{\sqrt{x+h+2}+\sqrt{x+2}}$

$$As h \rightarrow\ 0$

$\frac{1}{\sqrt{x+2}+\sqrt{x+2}}$

$\frac{1}{2\sqrt{x+2}}$

Edit:Yis I'm becoming good at latex

Zokunu · Sep 19, 2013

Menomaths said:
$\frac{1}{h} \times \frac{h}{\sqrt{x+h+2}+\sqrt{x+2}}$

$= \frac{1}{\sqrt{x+h+2}+\sqrt{x+2}}$

$$As h \rightarrow\ 0$

$\frac{1}{\sqrt{x+2}+\sqrt{x+2}}$

$\frac{1}{2\sqrt{x+2}}$

Edit:Yis I'm becoming good at latex

thx Meno

. One more question related to this. Find dy/dx if y= a^2 + b^3 + c

isn't supposed to be 2a + 3b^2?
The answer is 0?

Menomaths · Sep 19, 2013

Zokunu said:
thx Meno . One more question related to this. Find dy/dx if y= a^2 + b^3 + c

isn't supposed to be 2a + 3b^2?
The answer is 0?

$\frac{dy}{dx}$ I think the answer is 0 because you have to differentiate with respect to y. a,b, and c are basically constants

Carrotsticks · Sep 19, 2013

Menomaths said:
$\frac{dy}{dx}$ I think the answer is 0 because you have to differentiate with respect to y. a,b, and c are basically constants

Yep, this.

Suppose y=x^3, then dy/dx = 3x^2 as we usually do because we are differentiating with respect to x.

However, if we were to differentiate with respect to z, we would have dy/dz = 0, since in the 'eyes of the z function', y=x^3 is just a Constant function.

He has no z's in him, so therefore 'dy/dz' is not interested in him and treat him as a Constant.

Nobody cares about Constant.

Hence, dy/dz = 0.

==============

Alternatively, y=x^3 = y=z^0 * x^3, and differentiating with respect to z makes us 'bring the 0 down', hence we get 0.

Make a Difference – Donate to Bored of Studies!

Quick math question? (1 Viewer)

Zokunu

Member

Carrotsticks

Retired

Zokunu

Member

Carrotsticks

Retired

Zokunu

Member

Carrotsticks

Retired

Zokunu

Member

Menomaths

Exaı̸̸̸̸̸̸̸̸lted Member

Zokunu

Member

Menomaths

Exaı̸̸̸̸̸̸̸̸lted Member

Carrotsticks

Retired

Users Who Are Viewing This Thread (Users: 0, Guests: 1)