Algebra
Calculus
Trigonometry
Matrix
Question
Solve the equation
Solve for x
Solve for y
x=−∣y∣2634y,y=0x=∣y∣2634y,y=0
Evaluate
x2y−2532=4
Rewrite the expression
yx2−2532=4
Move the constant to the right-hand side and change its sign
yx2=4+2532
Add the numbers
yx2=2536
Divide both sides
yyx2=y2536
Divide the numbers
x2=y2536
Take the root of both sides of the equation and remember to use both positive and negative roots
x=±y2536
Simplify the expression
More Steps
Evaluate
y2536
To take a root of a fraction,take the root of the numerator and denominator separately
y2536
Simplify the radical expression
More Steps
Evaluate
2536
Write the expression as a product where the root of one of the factors can be evaluated
4×634
Write the number in exponential form with the base of 2
22×634
The root of a product is equal to the product of the roots of each factor
22×634
Reduce the index of the radical and exponent with 2
2634
y2634
Multiply by the Conjugate
y×y2634×y
Calculate
∣y∣2634×y
Calculate the product
∣y∣2634y
x=±∣y∣2634y
Separate the equation into 2 possible cases
x=∣y∣2634yx=−∣y∣2634y
Calculate
{x=−∣y∣2634yy=0{x=∣y∣2634yy=0
Solution
x=−∣y∣2634y,y=0x=∣y∣2634y,y=0
Show Solution
Testing for symmetry
Testing for symmetry about the origin
Testing for symmetry about the x-axis
Testing for symmetry about the y-axis
Not symmetry with respect to the origin
Evaluate
x2y−2532=4
To test if the graph of x2y−2532=4 is symmetry with respect to the origin,substitute -x for x and -y for y
(−x)2(−y)−2532=4
Evaluate
More Steps
Evaluate
(−x)2(−y)−2532
Multiply the terms
More Steps
Evaluate
(−x)2(−y)
Rewrite the expression
x2(−y)
Use the commutative property to reorder the terms
−x2y
−x2y−2532
−x2y−2532=4
Solution
Not symmetry with respect to the origin
Show Solution
Rewrite the equation
r=3cos2(θ)sin(θ)23317
Evaluate
x2y−2532=4
To convert the equation to polar coordinates,substitute x for rcos(θ) and y for rsin(θ)
(cos(θ)×r)2sin(θ)×r−2532=4
Factor the expression
cos2(θ)sin(θ)×r3−2532=4
Subtract the terms
cos2(θ)sin(θ)×r3−2532−(−2532)=4−(−2532)
Evaluate
cos2(θ)sin(θ)×r3=2536
Divide the terms
r3=cos2(θ)sin(θ)2536
Solution
More Steps
Evaluate
3cos2(θ)sin(θ)2536
To take a root of a fraction,take the root of the numerator and denominator separately
3cos2(θ)sin(θ)32536
Simplify the radical expression
More Steps
Evaluate
32536
Write the expression as a product where the root of one of the factors can be evaluated
38×317
Write the number in exponential form with the base of 2
323×317
The root of a product is equal to the product of the roots of each factor
323×3317
Reduce the index of the radical and exponent with 3
23317
3cos2(θ)sin(θ)23317
r=3cos2(θ)sin(θ)23317
Show Solution
Find the first derivative
Find the derivative with respect to x
Find the derivative with respect to y
dxdy=−x2y
Calculate
x2y−2532=4
Take the derivative of both sides
dxd(x2y−2532)=dxd(4)
Calculate the derivative
More Steps
Evaluate
dxd(x2y−2532)
Use differentiation rules
dxd(x2y)+dxd(−2532)
Evaluate the derivative
More Steps
Evaluate
dxd(x2y)
Use differentiation rules
dxd(x2)×y+x2×dxd(y)
Use dxdxn=nxn−1 to find derivative
2xy+x2×dxd(y)
Evaluate the derivative
2xy+x2dxdy
2xy+x2dxdy+dxd(−2532)
Use dxd(c)=0 to find derivative
2xy+x2dxdy+0
Evaluate
2xy+x2dxdy
2xy+x2dxdy=dxd(4)
Calculate the derivative
2xy+x2dxdy=0
Move the expression to the right-hand side and change its sign
x2dxdy=0−2xy
Removing 0 doesn't change the value,so remove it from the expression
x2dxdy=−2xy
Divide both sides
x2x2dxdy=x2−2xy
Divide the numbers
dxdy=x2−2xy
Solution
More Steps
Evaluate
x2−2xy
Reduce the fraction
More Steps
Evaluate
x2x
Use the product rule aman=an−m to simplify the expression
x2−11
Subtract the terms
x11
Simplify
x1
x−2y
Use b−a=−ba=−ba to rewrite the fraction
−x2y
dxdy=−x2y
Show Solution
Find the second derivative
Find the second derivative with respect to x
Find the second derivative with respect to y
dx2d2y=x26y
Calculate
x2y−2532=4
Take the derivative of both sides
dxd(x2y−2532)=dxd(4)
Calculate the derivative
More Steps
Evaluate
dxd(x2y−2532)
Use differentiation rules
dxd(x2y)+dxd(−2532)
Evaluate the derivative
More Steps
Evaluate
dxd(x2y)
Use differentiation rules
dxd(x2)×y+x2×dxd(y)
Use dxdxn=nxn−1 to find derivative
2xy+x2×dxd(y)
Evaluate the derivative
2xy+x2dxdy
2xy+x2dxdy+dxd(−2532)
Use dxd(c)=0 to find derivative
2xy+x2dxdy+0
Evaluate
2xy+x2dxdy
2xy+x2dxdy=dxd(4)
Calculate the derivative
2xy+x2dxdy=0
Move the expression to the right-hand side and change its sign
x2dxdy=0−2xy
Removing 0 doesn't change the value,so remove it from the expression
x2dxdy=−2xy
Divide both sides
x2x2dxdy=x2−2xy
Divide the numbers
dxdy=x2−2xy
Divide the numbers
More Steps
Evaluate
x2−2xy
Reduce the fraction
More Steps
Evaluate
x2x
Use the product rule aman=an−m to simplify the expression
x2−11
Subtract the terms
x11
Simplify
x1
x−2y
Use b−a=−ba=−ba to rewrite the fraction
−x2y
dxdy=−x2y
Take the derivative of both sides
dxd(dxdy)=dxd(−x2y)
Calculate the derivative
dx2d2y=dxd(−x2y)
Use differentiation rules
dx2d2y=−x2dxd(2y)×x−2y×dxd(x)
Calculate the derivative
More Steps
Evaluate
dxd(2y)
Simplify
2×dxd(y)
Calculate
2dxdy
dx2d2y=−x22dxdy×x−2y×dxd(x)
Use dxdxn=nxn−1 to find derivative
dx2d2y=−x22dxdy×x−2y×1
Use the commutative property to reorder the terms
dx2d2y=−x22xdxdy−2y×1
Any expression multiplied by 1 remains the same
dx2d2y=−x22xdxdy−2y
Use equation dxdy=−x2y to substitute
dx2d2y=−x22x(−x2y)−2y
Solution
More Steps
Calculate
−x22x(−x2y)−2y
Multiply
More Steps
Multiply the terms
2x(−x2y)
Any expression multiplied by 1 remains the same
−2x×x2y
Multiply the terms
−4y
−x2−4y−2y
Subtract the terms
More Steps
Simplify
−4y−2y
Collect like terms by calculating the sum or difference of their coefficients
(−4−2)y
Subtract the numbers
−6y
−x2−6y
Divide the terms
−(−x26y)
Calculate
x26y
dx2d2y=x26y
Show Solution