Q: The area bounded by y = e*, y = 2, and the y– axis is equal to
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Q: Find the area bounded by the parabolas x2+y-9=0 and x2-8y=0 (SOLVE BY USING INTEGRAL CALCULUS)
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Q: i. Find the exact area between f(x) 7x + 10, the x-axis, x 0, and x = 5.
A: "Since you have asked multiple question, we will solve the first question for you. If you want any…
Q: Find the area bounded by the parabola x = y² + 2 and the line y = x – 8. 11 -2 3.
A: We have to find out the area bounded by the two curves
Q: Find the area between the two Curves- Ai y= x²+ 2x, X-2y=1
A: Given: y=x2+2xx-2y=1 To Find: The area between the given two curves.
Q: (d) Find the area between the two curves 3 y = 1+r2 y = r² - 1
A: # We are entitled to solve one question at a time , please resubmit the other question if you wish…
Q: Find the area within the curves y= 25- x', 256x=3y², and 16y = 9x².
A: as per the guideline i can solve only first question
Q: f(x) = x^3 + 4x and g(x) = 6x^2 - x Find the area between the two curves
A: We have to find the area between the given curves.
Q: 4. Find the area of the shaded region by integrating with respect to 'y', y-2x-4 1.-2)
A: The area between two curves f1 and f2 between the points y=a to y =b is given by; A=∫ab(f2-f1)dy
Q: Determine the area between the graphs of the equations y=x and y=(x)^2-1. Integrate over the x-axis…
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Q: Solve the area bounded by y3 + 10y + 5 = x², the y-axis and the lines y=0 and y=3 *
A: Given: The boundary curve1. y3+10y+5 = x2 OR x = ±y3+10y+5 2. y=03. y=34. x=0 y-axisThe given…
Q: Find the area between the CUoyes y=9-x² and y= -5
A: For any two curves f(x) and g(x) which intersect at points with x-coordinates a and b and bound a…
Q: Find the area bounded by the parabola x² = - (y - 1) and the first quadrant.
A: Intersection points:y=0x2=1;x=1 (First quadrant)(1, 0)x=0:1-y=0y=1(0, 1)
Q: Find the area bounded by the parabolas (x-3)² - 16ky = 0 and y² - 16k (x-3) = 0.
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Q: Find the area between y=x+2 and y=3x2+x for 1≤x≤2.
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Q: Find the area between the curve y (2.x + 3)2 and the x-axis, from x = -2 to x = 3.
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Q: Find the area between the corves y= 2-x² and
A: Find the area between the two given curves First draw both the equations in a single plane To draw…
Q: Find the area under the parabola y = 8 - x^2 -2x, above the x axis
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Q: Find the area contained between the two curves y = 3x - 2² and y=x+x².
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Q: Find the area between the graph of y = and the x-axis for x e [0, b] where b is a (2x2 + 1)2…
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Q: Find the area between x = y2, x - axis, x =y +2 To find the intersect points
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Q: Find the area bounded by the curve y= lnx, the x– axis, the line x = e². A =1+e?
A: Use area formula
Q: Find the area bounded by the curve a?y = x3 the x- axis, and the line x-2a. Solve with respect to x.…
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Q: Find the area between the curves: y2=x x2– 2x + 3y = 2
A: we have to find the area between the curves :
Q: The area formed by the boundaries y=1, x=2, and y=e^(-x) is closest to:
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Q: Find the area bounded by y² = 4a(y-x), y² = 2a(x+2y-3a) and the x-axis
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Q: Find in two ways the area bounded by the parabola y=x^2, the y-axis, and the lines y=1, y=4
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Q: Find the area lying between the parabola y = 4x – x² and the line y = x -
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Q: Find the area enclosed by the curve x = t2 − 3t, y = Square root of t
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Q: Find the area in the second quadrant bounded by the curve y = x' +4x² – x – 4 and the x – axis.
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Q: Find the area bounded by the parabolas x2 – 2y = 0 and x2 + 2y = 8.
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Q: Find the area between f(x)=x2 and f(x)=x3 in the first quadrant.
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Q: Find the area lying between the parabola y=4x - x^2 and the line y = x.
A: The given curves are y=4x-x2 and y=x. To find the area between the curves we will firstly plot these…
Q: Find the area bounded by the parabolas (x - 2)² - 9py = 0 and y² = 9p(x - 2).
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Q: Find the area bounded by the given curves. y = 2x – x², y = 2x – 4 - Write your answer in the form…
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Q: B) Find the area between the parabolas x = y² - 1 and x = 2y² - 2
A: Topic = Area
Q: Solve the area bounded by y³+10 = x², the lines y=-2 and y=2 *
A: Here is the solution of the given problem. To evaluate the integration we use there WOLFRAM ALPHA.
Q: . Find the area bounded by y = (11 – x), the lines 3x=2, x=10, and the x-axis.
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Q: Find the area in the first quadrant bounded by y=3x, y=0 and y=4 by integrating with respect to x.
A: By using area bounded by curve formula, we calculate the value of required area.
Q: Find the area bounded by the parabola y2= 4x, the x – axis and the lines x=1 and x=3.
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Q: Find the area enclosed by the line y = x -1 and the parabola y² = 2.x + 6.
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Q: The area bounded by the parabola x² = 2y, and the line x - y = -4 is 18 square units. %3D
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Q: Find the area of the region bounded by the curve y = e2x - 3e* + 2 and the x-axis.
A: The region is bounded by the graph y=e2x-3ex+2 and the x-axis.
Q: Solve the area bounded by y3 + 10y + 5 = x², the y-axis and the lines y=O and y=3
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Q: Now, the area is given by - 4y²) – (4y² – 4)] dy = L7(! dy.
A: From the area of a function..
Q: Find the area in the first quadrant bounded by y=4x-x² and the x-axis
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Q: Find Fhe area of the equations qo gue egion bounded b Jantl and the X=3
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Q: Find the area enclosed by the curve x = t2 − 2t, y = square Root(t) and the y-axis.
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Q: Find the area in the first quadrant bounded by the curve y = 2x^2 the y - axis, and y = 3
A: we have to find area in the first quadrant bounded by the curves…
Q: Calculate the area between these equations, y=2/(1+x^2) , y=-x+6 and x=0
A: Given: To calculate the area between equations y=2(1+x2) y=-x+6 and x=0 Area between the curve…
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- Prove that bx=exln(b) for positive b1 .Question Number 4: Sketch the curve and find the total area between the curve and the given interval on X-axis.i) y=sinx; [0,3pi/2]ii) y=x2-1/x2 ; [1/2,2]QUESTION 1 Find the area under the χ2-curve with 5 degrees of freedom to the right of the following values: a) 1.6 % b) 9.24 % c) 15.09
- Question 3 Calculate the integral, where K represents the globe K: x^2 +y^2+z^2 less than or equal to a^2 a has a radius a>0 Need to be done in 25 minutesQuestion 23 Find the second darivativeQuestion 9: Use left-endpoint approximation to approximate the area under the curve f(x)=−0.2x2+22f(x)=-0.2x2+22 between x=1x=1 and x=7x=7 using 6 rectangles. (Feel free to use your calculator on a majority of the calculations.)Approximate the area under the curve f(x)=−0.2x2+22f(x)=-0.2x2+22 between x=1x=1 and x=7x=7 using 12 rectangles.Approximate the area under the curve f(x)=−0.2x2+22f(x)=-0.2x2+22 between x=1x=1 and x=7x=7 using 60 rectangles.