WebGraph y = square root of 3x y = √3x y = 3 x Find the domain for y = √3x y = 3 x so that a list of x x values can be picked to find a list of points, which will help graphing the radical. Tap for more steps... Interval Notation: [0,∞) [ 0, ∞) Set -Builder Notation: {x x ≥ 0} { x x ≥ 0 } Web8 sep. 2024 · If the line y = √3x + k touches the circle x2 + y2 = 16, then find the value of k. conic sections class-11 1 Answer +1 vote answered Sep 8, 2024 by Chandan01 (51.5k …
Reduce the equation √3x + y + 2 = 0 to: (i) slope - Sarthaks
Web5 sep. 2024 · Solution : line parallel to y = √3x so, slope of line is √3 = tan60° Line passing through Q (2,3) and cuts 2x + 4y - 27 = 0 at P. Let distance between P and Q = r so parametric equation of line (2 + rcos60° , 3 + rsin60°) = (2 + r/2, 3 + √3r/2) This point should satisfy the equation of line 2x + 4y - 27 = 0 ⇒2 (2 + r/2) + 4 (3 + √3r/2) - 27 = 0 Web9 feb. 2024 · Reduce the equation √3 3 x + y = 4 into normal form and find the values of P and a. straight lines class-11 Share It On 1 Answer +1 vote answered Feb 9, 2024 by Aabhat (31.1k points) selected Feb 9, 2024 by Daakshya Best answer The given equation is … jeffrey smith keller williams
Find area of region bounded by curves x^2 + y^2 = 4, y = √
WebFind the angle which the straight line y=3x−4 makes with y-axis. Easy Solution Verified by Toppr We have, y= 3x−4 Slope = m= 3 tan θ = 3 θ=60 o This is the angle made by the … Web12 mei 2024 · Step-by-step explanation: According to the given question, y = root3x-4. And we are asked to find the angle it makes with y - axis. So, by comparing the given equation with the general; y = mx+c. We get, m = root3. So m = root3 and we know m is called the slope of the line by measuring from x-axis. WebReduce the Equation √ 3 X + Y + 2 = 0 to the Normal Form and Find P and α. Department of Pre-University Education, Karnataka PUC Karnataka Science Class 11 Textbook ... This is the normal form of the given line. Here, p = 1, \[cos\alpha = - \frac{\sqrt{3}}{2}\] and \[sin\alpha = - \frac{1}{2}\] \[\Rightarrow \alpha = {210}^\circ\] jeffrey smith judge