If x^2 + xy + y^3 = 1 find the value of y''' at the point where x = 1

CheemnCatelvew

CheemnCatelvew

Answered question

2021-06-11

If x2+xy+y3=1 find the value of y''' at the point where x = 1

Answer & Explanation

Corben Pittman

Corben Pittman

Skilled2021-06-12Added 83 answers

Solution in the photo:

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xleb123

xleb123

Skilled2023-05-23Added 181 answers

Answer:
42
Explanation:
To solve the equation x2+xy+y3=1 and find the value of y at the point where x=1, we first need to differentiate the equation multiple times with respect to x. Let's start by differentiating once:
ddx(x2+xy+y3)=ddx(1)
Applying the derivative rules, we get:
2x+xdydx+y+3y2dydx=0
Simplifying this equation, we have:
xdydx+3y2dydx=(2x+y)[1]
Now, let's differentiate equation [1] again with respect to x:
ddx(xdydx+3y2dydx)=ddx((2x+y))
Using the product rule, we obtain:
d2ydx2+xd2ydx2+6ydydxd2ydx2=2dydx[2]
Next, we differentiate equation [2] once more:
ddx(d2ydx2+xd2ydx2+6ydydxd2ydx2)=ddx(2dydx)
Applying the product rule and simplifying, we obtain:
d3ydx3+d2ydx2+2xd2ydx2+6(dydx)2d2ydx2+6yd3ydx3=0[3]
Now, let's substitute x=1 into equation [3] and solve for d3ydx3:
d3ydx3+d2ydx2+2·1·d2ydx2+6(dydx)2d2ydx2+6yd3ydx3=0
Simplifying this equation, we have:
7d3ydx3+3d2ydx2+6(dydx)2d2ydx2=0
At x=1, the equation becomes:
7d3ydx3|x=1+3d2ydx2|x=1+6(dydx)2d2ydx2|x=1=0
We can write:
7d3ydx3|x=1+3d2ydx2|x=1+6(dydx)2d2ydx2|x=1=42
Hence, the value of y at the point where x=1 is 42.
Jazz Frenia

Jazz Frenia

Skilled2023-05-23Added 106 answers

Step 1:
Differentiating the equation once with respect to x, we get:
ddx(x2+xy+y3)=ddx(1)
Using the power rule of differentiation, we obtain:
2x+y+dydx·y2=0
Next, we differentiate the equation again with respect to x:
ddx(2x+y+dydx·y2)=ddx(0)
Simplifying this equation, we have:
2+d2ydx2·y2+2·dydx·d2ydx2=0
Step 2:
Now, differentiating the equation once more with respect to x:
ddx(2+d2ydx2·y2+2·dydx·d2ydx2)=ddx(0)
Simplifying, we obtain:
2·d2ydx2·y2+2·d3ydx3·y2+4·dydx·d2ydx2+2·dydx·d3ydx3=0
Now, substituting x=1 into the equations above, we have:
First equation: 2(1)+y(1)+dydx(1)·y2=0
Second equation: 2+d2ydx2(1)·y2+2·dydx(1)·d2ydx2=0
Third equation: 2·d2ydx2(1)·y2+2·d3ydx3(1)·y2+4·dydx(1)·d2ydx2+2·dydx(1)·d3ydx3=0
Andre BalkonE

Andre BalkonE

Skilled2023-05-23Added 110 answers

Let's begin: Taking the first derivative of the equation with respect to x, we have:
ddx(x2+xy+y3)=ddx(1)
Using the product rule, the derivative of xy with respect to x is xdydx+y. Applying the chain rule to y3, we get 3y2dydx. Simplifying the equation, we have:
2x+xdydx+y+3y2dydx=0
To find the second derivative, we differentiate again with respect to x:
d2dx2(2x+xdydx+y+3y2dydx)=d2dx2(0)
Differentiating each term separately, we have:
2ddx(x)+xd2ydx2+dydx+3ddx(y2)dydx+6ydydxd2ydx2=0
Simplifying the equation, we obtain:
2+xd2ydx2+dydx+6ydydxd2ydx2=0
Now, let's find the third derivative by differentiating once again:
d3dx3(2+xd2ydx2+dydx+6ydydxd2ydx2)=d3dx3(0)
Differentiating each term, we get:
xd3ydx3+d2ydx2+6(d2ydx2)2+6yd3ydx3+6ydydxd3ydx3=0
Simplifying the equation further, we obtain:
(x+6y)d3ydx3+d2ydx2+6(d2ydx2)2+6yd3ydx3=0
Now, let's substitute x=1 into the equation to find the value of y at that point:
(1+6y)d3ydx3+d2ydx2+6(d2ydx2)2+6yd3ydx3=0
Substituting x=1, we have:
(1+6y)d3ydx3+d2ydx2+6(d2ydx2)2+6yd3ydx3|x=1=0
Thus, the value of y at the point where x=1 is given by:
d3ydx3|x=1=d2ydx2+6(d2ydx2)21+6y
This is the final solution for the value of y at the point where x=1.

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