Derivative
Antiderivative
Product Rule
Implicit Differentiation
Chain Rule
100

15x7

105x6

100

∫2x5dx

1/3x6

100

−x3(3x4 − 2)

-21x6+6x2

100

x+y=3x

dy/dx = 2

100
(5x4+1)2​​​​

40x3(5x4+1)

200

2x2*4x4

48x5

200

∫1-3x2-6x dx

x - x- 3x2 + c

200

((-2x4-3)(-2x2+1))

24x5-8x3+12x

200

2y+4x2 = 3y2-7

dy/dx = -8x/2-6y

200

(3x-1)(-3x2-4)-3

3(15x2-6x-4)/(-3x2-4)2

300

3x7/2x8

-3/2x2

300

∫3x2*4x4dx

12x7/7 + C

300

((2-3x)(x2+5x-1))

-9x2-26x+13

300

3xy+4y= 3x3

dy/dx = 9x2-3y/3x+8y

300

(5x5-3/-3x3+1)3

3x2(5x5-3)2(-30x5+25x2-27)/(-3x3+1)4

400

(x3+2x)4

4(x3+2x)3(3x2+2)

400

∫sin(2x)4x2dx

-2x2cos(2x)+2xsin(2x)+cos(2x)+c

400

(cos(2x2)3x)

3(-4x2sin(2x2)+cos(2x2))

400

y/x +2y = 3x2

dy/dx = 6x3=y/x+2y

400

(x5+4/x2-5)1/5

x(3x5-25x3-8)/5(x5+4)4/5(x2-5)6/5

500

(8x3*2x5)4

2097152x31

500

∫(2x2e^3)dx

(2/2e3+1)x(2e^3)+1+c

500

(cos(2x2)cos(3x4))

-4xsin(2x2)cos(3x4)-12x3sin(3x4)cos(2x2)

500

2(x+y3)2+2x = 5x2y

dy/dx = 10xy-4x-4y3-2/12xy2+12y3-5x2

500

5√x2-3 /-x-5

3x2-15-10x/5(-x-5)2(x2-3)4/3

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