Question

Sketch the curve of the graph of y = (the square root of (1-x^2)) / x

Find the domain and range

Maximum and Minimum

First derivative and second derivative

Answer #1

Please see the solution

Thanks

find the domain, sketch and sketch the level curve ofsquare root
of 2x-y^2 +1

how to sketch the function f(x)= x^2/square root (x+1)

Find the area of the surface generated by revolving the curve x
= ?square root 4y − y2, 1 ≤ y ≤ 2, about y-axis.

a) Find the domain and range of the following function:
f(x,y)=sin(ln(x+y))
b) sketch the domain.
c) on seperate graph, sketch three level curves

For f(x,y)=ln(x^2−y+3). -> Find the domain
and the range of the function z=f(x,y).
-> Sketch the domain, then
separately sketch three distinct level curves.
-> Find the linearization of
f(x,y) at the point
(x,y)=(4,18).
-> Use this linearization to determine the
approximate value of the function at the point (3.7,17.7).

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y=4 square root x(x-4) over x3+4

find the equation of a tangent line to the curve x = ( square
root of t) / (1+t^2) at t = 4

Find traits and sketch the graph the equation
for a function g ( x ) that shifts the function f ( x ) = x + 4 x 2
− 16 two units right. Label and scale your
axes.
Domain:
x – Intercepts:
y – Intercept:
Vertical Asymptotes:
Holes:
End Behavior:
Range:

Find the derivative of y with respect to the independent
variable.
y=log6 (x2 over 10 square root
x+1)

Sketch y = 2 sin(x) + x - 2
(b) This graph intersects the x-axis exactly once.
(i) Show that the x-intercept of the graph does not lie in the
interval (0, 0.7)
(ii) Find the the value of a, 0<a<1 for which the graph
will cross the x-axis in the interval (a, a + 0.1) and state this
interval
(iii) Given x = alpha is the root of the equations 2 Sin(x) + x
- 2 = 0, explain...

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