If the line y root3x cuts the curve x 4
WebThe area (in sq units) bounded by the curves y = βx, 2y - x + 3 = 0, X-axis and lying in the first quadrant is. asked Oct 11, 2024 in Mathematics by Samantha (39.2k points) integral calculus; jee; jee mains; 0 votes. 1 answer. WebIf A is the area of the region bounded by the curve y = 3 x + 4, x-axis and the lines x = - 1 and x = 4 and B is the area bounded by curve y 2 = 3 x + 4, x-axis and the lines x = - 1 and x = 4, then A: B = A 1: 1 B 2: 1 C 1: 2 D None of these Solution The correct option is A 1: 1 Explanation for the correct option: Step 1. Find the value of A: B:
If the line y root3x cuts the curve x 4
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WebArea under the curve y = β (3x + 4) between x = 0 and x = 4 is Question Area under the curve y= 3x+4 between x=0 and x=4 is A 8 sq. unit B 9112 sq. unit C 956 sq. unit D None of these Medium Solution Verified by Toppr Correct option is B) m=3x+4 dm=3dx When x=0 , m=4 , x=4 , m=16 β« 043x+4dx = 31β« 416mdm = 31[ 23m 23] 416 92[4 3β2 3]= 92Γ56squnits WebSolution The correct option is C 32 3 sq units Explanation of correct answer : Finding the area bounded by the curves : The graph for the curves is as shown: The shaded portion is the area bounded by the curve x = 4 - y 2 and y-axis. The required area is given as:
Web6 nov. 2024 Β· Sol: The line y = β3 x can be written as x = r/2 , y = β3 r/2 If this line cuts the given curve, then r 4 16 + a r 3 3 8 + b r 2 3 4 + c r 2 + d r 3 2 + 6 = 0 Therefore OA. β¦ WebIf the curves x = y 4 and x y = k cut at right angles. The slope of tangent to the curve x = y 4. β 1 = 4 y 3 d y d x β m 1 = 1 4 y 3..... (1) And the slope of tangent to the curve x y = β¦
WebIf the line y = β (3x) cuts the curve x^4 + ax^2y + bxy + cx + dy + 6 = 0 at A,B,C and D , then OA.OB.OC.OD is equal to ( O being origin) Class 11. >> Applied Mathematics. >> β¦
Web11K views 8 years ago Ncert solutions for class 11 maths chapter 10 straight lines 9. Find angles between the lines root 3 x + y = 1 and x + root 3 y = 1 Show more Show more β¦
Web30 dec. 2024 Β· Area under the curve y = β (3 + 4) between x = 0 and x = 4 is (A) 56/9 sq. units. β Prev Question Next Question β. 0 votes. 7.3k views. asked Dec 30, 2024 in β¦ bishop o dowd high school oakland.caWebIf the line y β 3x + 3 = 0 cuts the parabola y2 = x + 2 at A and B, then P A.PB is equal to (where P is 3,0 ) 2066 69 Conic Sections Report Error A 34( 3+2) B 34(2β 3) C 4 33 D 32( 3+2) Solution: yβ 3x+ 3 = 0 can be written as 23yβ0 = 21xβ 3 = r ...(1) Solving (1) with the parabola y2 = x +2 we get 43r2 = 2r + 3+2 β 3r2 β2r β(4 3+8) = 0 bishop of ame churchWebSolution: Any point on the line y = 3x at a distance r from the origin is (2r, 23r) . This point lies on the given curve if 8r3 + 83 3r3 + 43 3r2 + 45r2 + 49r2 +2r + 25 3r β1 = 0 β (3 3 β¦ dark peach quiltWebstraight lines If the line y=β (3).x cuts the curve x 3 +y 3 +3xy+5x 2 +3y 2 +4x+5y-1=0 at the points A,B,C then OA.OB.OC is a. {4 (3β3-1)}/13 b.3β3+1 c. (2/β3) +7 d.none of these Menka Malguri, 11 years ago Grade:12th Pass 1 Answers Ashwin Muralidharan IIT Madras 290 Points 11 years ago Hi Menka, bishop of aston birminghamWeb30 mrt. 2024 Β· Given curve π¦^2=π₯ Let AB represent the line π₯=π CD represent the line π₯=4 Since the line π₯=π divides the region into two equal parts β΄ Area of OBA = Area of ABCD 2 Γ β«_0^π γπ¦ ππ₯γ="2 Γ" β«_π^4 γπ¦ ππ₯γ β«_π^π γπ π
πγ=β«_π^π γπ π
πγ Now, y2 = x y = Β± βπ₯ Since, the curve is symmetric about x-axis we can take either positive or negative value of π¦ So, lets β¦ dark performance gymWebCorrect Option: A Solution: Step 1: Find the slope of the line We have given, Equation of line yβ3x+3=0 y=3xβ3 Slope =tanΞΈ=3 βΞΈ= 3Ο β¦(1) Step 2: Use parametric form of β¦ dark peppered moth evolution storyWebEquation of line passing through the centre of circle is 2 (2)+3 (0)+K1=0 => K1=-4. rendering the required line to L1:2x+3y-4=0. => x=2-1.5y. The intersecting points of L1 & β¦ bishop of alexandria