The curve above is the graph of a sinusoidal function. It goes through the points (- 4, 4) and (2, - 4). Find a sinusoidal function that matches the given graph. If needed, you can enter π = 3.1416... as 'pi' in your answer, otherwise use at least 3 decimal digits.
f(x) = _______
The curve above is the graph of a sinusoidal function. It goes through the points (- 4, 4) and (2, - 4)
7 8 4 5 6 23 -3 -2-1 12-11-10-0 -8-7-6 -5-4 -2 -3 + function that matches the given graph. If needed, you can enter 3.1416... as pi' in your answer, otherwise use at least 3 decimal digits. The curve above is the graph of a sinusoidal function. It goes through the points (-8,0) and (2, 0). Find a sinusoidal Preview f(z)= Get help: Video License
7 8 4 5 6 23 -3 -2-1 12-11-10-0 -8-7-6 -5-4 -2 -3 +...
Question 9 0/1 pt 2 Detai 8 -8 - -2 -2 -5 a The curve above is the graph of a sinusoidal function. It goes through the points (-4, 4) and (2, 4). Find a sinusoidal function that matches the given graph. If needed, you can enter i =3.1416... as 'pi' in your answer, otherwise use at least 3 decimal digits. f(3) =
4+ 2 1 ༡ པོ 12 -11 00 -9 -8 -7 -6 -5 -4 -3 -2 -l 2 3 4 5 6 7 8 -2 -4 -3 ༢ The curve above is the graph of a sinusoidal function. It goes through the points ( - 8, - 3) and (2, - 3) Find a sinusoidal function that matches the given graph. If needed, you can enter T=3.1416... as 'pi' in your answer, otherwise use at least 3 decimal digits. ༼(c)...
(1 point) The curve above is the graph of a degree 4 polynomial. It goes through the point (5,-270). Find the polynomial. f(x) =
Find the exponential function f ( x ) = Ca^x whose graph goes through the points ( 0 , 2 ) and ( 2 , 8 ) . a= C=
just make circle questions which 2,(b) and 3,(i) thank
you
2. (Polar Coordinates: Polar Plots). (a) Consider the curve given in polar coordinates (i) Use a scientific calculator to fill in the following table with the (approximations of) values of the function r(0) on π, π r(e) (the approximations of the values r(e) must be good to at least two decimal places). (i) Use the graph paper for the polar coordinate system (attached to the assignment sheet) to plot the...
Problem 1. [12 points; 4, 4, 4- Consider the function f(x,y) 1 2- (y-1)2 (i) Draw the level curve through the point P(1, 2). Find the gradient of f at the point P and draw the gradient vector on the level curve (ii) Draw the graph of f showing the level curve in (i) on the graph (iii) Explain why the function f admits a global minimum over the rectangle 0 x 2, y 1. Determine the minimum value and...
Find the polynomial of degree 4 whose graph goes through the points (-3,-194), (-2,-36), (0, 10), (2, 16), and (3, -56) f(x) +10
Use the graph of the function to find the indicated values.
This figure has a wavy curved line graphed on the x y-coordinate
plane. The x-axis runs from negative 2 times pi to 2 times pi. The
y-axis runs from negative 6 to 6. The curved line segment goes
through the points (negative 2 times pi, 0), (negative 3 divided by
2 times pi, 2), (negative pi, 0), (negative 1 divided by 2 times
pi, negative 2), (0, 0), (1...
In Problems 27-30 (a) Sketch the graph of a transformed tangent function with the given properties. (b) Use your graph to find a possible formula of the form f(t) Atan(Bt) + C. 27. Vertical asymptotes at every odd integer multiple of π and ptotes at every odd integer multiple on 29. A vertical asymptote at every odd integer and passing passing through the points (0,0) and (π/2, l) and passing through the points (0,0) and () through the points (0,0)...