Q: The y- intercept of the function f (x) = 6x2 + 11x – 7 is: elect one: O a. (7,0) O b. (0,-7) O c.…
A: Explanation and solutions is given below.....
Q: g(x)= 1/6x-8, find g(6a-12) g(6a-12)= ?
A:
Q: Given the function: y = 4x-1, find f (7) %3D
A: The mathematical symbol f-1(7) represents the value of the inverse of the function at x=7.…
Q: A manufacturer of a microwave ovens believe that the revenue R , And dollars, that the company…
A: Comparing this equation with
Q: Complete the solution. If f(x) = -2x2 + 3x – 5, find f(-2). f(-2) = -21 + 3 + 3[ 5 + (-6) – 5 II
A: You just need to put value of x =2.
Q: Find f(-2). f(x)=3x2 - 8x + 7 A) B) 21 35 D) 38 3,
A:
Q: Q3: Find the extreme values of the function f(x, y) = xy – 3x2 - y? + 3x - 3y + 8.
A: To find the extreme values of f(x,y)=xy-3x²-y²+3x-3y+8
Q: Find all r-intercepts for the function f(x) = 4"1_ 2ª+1 – 12.
A:
Q: The average cost per hour in dollars of producing x riding lawn mowers is given by the following.…
A:
Q: For f(x) = find the x² + 3x + 2 domain, VA, HA and both x and y intercepts to graph. 3.
A:
Q: Find the domain of the function. v (x) = /4x+36 Write your answer using interval notation.
A: The given function is vx=4x+36, For vx∈R or v(x) to be real, 4x+36≥0
Q: -2 Find the value of f d(x3).
A:
Q: Q6:- Find the extreme value of the function f(x, y) = 3x2 - 2xy + y2 - 8y.
A: First, let us find the partial derivatives of the given function as shown below:…
Q: Find the domain of the function. v (x) = /-4x+28 Write your answer using interval notation.
A:
Q: Find y' for the function. - 8 4 2y* + 3x3
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Q: Q2// A :- find and sketch the Domain of f(x, y)=v(x-4)+y' -9 + V4-x²-y° 2
A:
Q: For the Function g(x)=1/8x-5, find g(8a-16)
A: First plug x=8a-16
Q: what are the t-intercepts of the function P(t)=6t-2/2t^2-6t? what is the domain of the function in…
A: We can make it easier for you
Q: Q3/Find the value of x If f'(3) = 52? 1 2 4 f(x) -2 8 X
A:
Q: For f(x)-x+4x - 18, glve the axis of symmetry and the coordinates of the vertex. The axis of…
A: Here we find axis of symmetry and vertex.
Q: Graph the function f(x) x² + 6x + 10 by first clicking on the vertex then clicking on a second…
A: topic - geometry and graphs
Q: Q2\ Find the domain, range and symmetry (Odd, Even or Non) of the function y = ? XIN 1,
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Q: The function S(x)= -x - 3x + 72x + 900, x 22, is an approximation to the number of salmon swimming…
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Q: The function P(x) = - 1.75a? + 1250x – 9000 gives %3D - the profit when x units of a certain product…
A:
Q: for g(x)=1/4x2 -2x+6 find the x-intercept
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Q: d²y/dx² of the function y=(5x² – 3)(7x³ + x)
A: The given function is: y=(5x2-3)(7x3+x)=5x2(7x3+x)-3(7x3+x)=35x5-16x3-3x To use the product rule for…
Q: Find (f.g)(-5) whenf(x)=-9x-9 and glx%%=D-8x2-8xtle
A:
Q: Find the values for which the function y 2x – 9r2 + 12r is (a) increasing; (b) decreasing.
A: Answer
Q: Find the symmetry of the function : Y = X2 + 2X – 3
A: Given: Y=X2+2X-3.
Q: Find the domain and range of the function f(x, y) = √(9 − 6x2 + y2).
A: Given f(x, y) = √(9 − 6x2 + y2)
Q: Why f(x) = - is not a polynomial function? %3D M 2х
A: In a polynomial function, exponent of the variable should not be fraction, radical or negative.
Q: The y– intercept of the function f (x) = 6x² + 11x – 7 is : Select one: O a. ( 7,0) O b. (0, -7) O…
A: The intercepts of a given function are points at which the graph crosses the axes. The x-intercept…
Q: r2 16 Use the function f(a) - to fill in the table: %3D
A:
Q: Find all zeros for the function f(r) = r* – 8a3 + 32? + 40x – 12
A:
Q: Find the x-intercept of the function 1x-2 g(x)=27 | 3.
A:
Q: The owner of a video store has determined that the profits P of the store are approximately given by…
A: Solve for the maximum profit
Q: Given the function , y = 4x2 + 9 Find f/ (3) and f/ (4).
A: Given that y=4x^2+9 To find f'(3) and f'(4)
Q: f fx)=3x²-2x and g(x)=2x-3, find (fog)x)
A: solve
Q: 5x Use the quotient rule to find f'(1) where f (x) 3x2+1
A: The function is given by fx = 5x3x2+1 To evaluate: The value of f'1.
Q: Q4: (C) Find the domain and range of: 1 (1) y = 22-1 x-1 (2) x+2
A: The domain of a function f(x) is a set of all the inputs that is the value of x for which the…
Q: Find f(6). f(x) = 2x3 + 3x -8 f(6) =?
A:
Q: Given the function f(r) = 4r* – 24r³ – 28r? its f-intercept is its r-intercepts are
A: The given function is f(r)=4r4-24r3-28r2
Q: use algebra to find the point at which the line g(x)=2/3x+11/3 intersects f(x)=4/3x+2
A: The given functions are as follows.
Q: find the domain and range of G(t) = 2/t2 - 16
A:
Q: Julia has tracked a Bouncy Ball company profits for several years, and her analysis has determined…
A: Put x = 0 for y intercept and simplify.
Q: Find the oblique asymptote. 7 - x3 f(x) = 2x2 7-x3 2x2 y =
A:
Q: The monthly profit for a small company that makes long-sleeve T-shirts depends on the price per…
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Q: Q4: (C) Find the domain and range of: (1) y = x-1 (2) x+2 1 x2-1
A: Domain: The set of all those points for which function is well defined. Range: Output of the given…
Q: In the xy plane, the graph of the function f(x) = x2 + 5x + 4 has two x-intercepts. What is the…
A: x- intercepts are the points where the function touches the x-axis. So if the function touches the…
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- Arectangular bird sanctuary is being created with one side along a straight riverbank. The remaining three sides are to be enclosed with a protective fence. If there are 12 km of fence available, find the dimension of the rectangle to maximize the area of the sanctuary.Hello, I was stuck on this one Optimization problem for Calculus A. The question is: A water tank is in the form of a triangular prism. The bottom is an equilateral triangle and the top is open. The volume of the tank must be 1000sqrt3 cubic inches. What is the minimum surface area of the tank? [Note: The Area of an equilateral triangle with a side length of x, is x2sqrt3/4] ThanksMaxim and minimum please
- A farmer wishes to fence off a rectangular field with 1000 ft of fencing. If the long side of field is field is along a stream (and does not require fencing) Find the dimensions of the large area that can be fenced in.required drawing.show drawing and complete solution.Explain the Lagrange multiplier method to solve optimization problems that have restrictions. Present an example applying the method step, it's result and interpretation.30 cm of wire is cut into 2 pieces. One piece is bent into a square, and the other piece is bent into a rectangle with a length to width ratio of 2:1. What are the lengths of the 2 pieces if the sum of areas of the square and rectangles is a minimum? Showcase your entire work and use calculus
- Elimination of Arbitrary ConstantA farmer has 600m of fencing to use for building a sheep pen in the shape of a semicircleon top of a rectangle. Find dimensions of the field which maximize thearea of the field6. A rectangular bird sanctuary is being created with one side along a straight riverbank. The remaining threesides are to be enclosed with a protective fence. If there are 12 km of fence available, find the dimensionof the rectangle to maximize the area of the sanctuary.
- using the method of separation of variables, solve the problem attachedRudgene Claire, the President of Women's Association of their barangay, proposed a project: to put up a rectangular vegetable garden whose lot perimeter is 40 meters. The said proposal aims to augment the financial needs of each member through sharing and giving free fresh vegetables and fruits during pandemic outbreak. She was soliciting suggestions from her fellow members for possible dimensions of the lot. If you are a member of the club, what will you suggest to Rudgene Claire if you want a maximum lot area? You must convince her through a mathematical solution. Consider the following guidelines: 1. Make an illustration of the lot with the needed labels. 2. Solve the problem. 3. Represent your solution in a (a) table of values, (b) graphs and (c) equation. 4. Create your recommendation.Rudgene Claire, the President of Women's Association of their barangay, proposed a project: to put up a rectangular vegetable garden whose lot perimeter is 40 meters. The said proposal aims to augment the financial needs of each member through sharing and giving free fresh vegetables and fruits during pandemic outbreak. She was soliciting suggestions from her fellow members for possible dimensions of the lot. If you are a member of the club, what will you suggest to Rudgene Claire if you want a maximum lot area? You must convince her through a mathematical solution