Describe the similarities and differences between the two curves \vec{\gamma}_{1}(t) = (3 + 3t)\vec{i} + (1 - t)\vec{j} + (3 + 4t)\vec{k}, -\infty\leq t\leq \infty and \vec{\gamma}_{2}(t) = (3 + 3t^{2 Determine whe...
Indifference Curves: Use & Impact in Economics from Chapter 3 / Lesson 12 27K In economics, indifference curves show which goods in the marketplace bring equal satisfaction to consumers, leaving them indifferent to which goods they purchase. Explore the definition, ...
If e(1) and e(2) represent the eccentricity of the curves 6x^(2) - 9y^(2) = 144 and 9x^(2) - 16y^(2) = 144 respectively . Then (1)/(e(1)^(2)) + (1)/(e(2)^(2))
If 3π/4<α<π, then sqrt(2cotalpha+1/(sin^2alpha)) is equal to (a) 1+... 02:24 Which of the following identities, wherever defined, hold(s) good? (a... 08:42 Find the coordinates of the points of intersection of the curves y=cos... 05:27 If y=(sinx+cos e cx)^2+...
Find the equation of the tangent line to the curves at the point x = 3: (a) y = 8 - x^2. (b) y = 2 / {x + 1}. (c) Using graphing calculator verify it. Determine the equation of the tangent line to the curve defined...
We are given the funtion {eq}\displaystyle\, f(x)= 3x^2+2,\;for\,x\geq 1 , {/eq}.The graph of the this curves is shown below: a) {eq}\begin... Learn more about this topic: Limit of a Function | Overvie...
Find the area of the region bounded by the curve y = x^2 -1, and the x-axis. Find the area of the region bounded by the x-axis and the curve y=x^2e^x between x=0 and x=1. 1. Find the area bounded by the curves y = x^2 + 1, y = 3 - x, the x-a...
Answer to: If the line y = m x - 5 does not meet the curve y = 3 x^2 - 6 x + 7 then value of m is in the open interval (a, b). Find the exact value...
Given curves are (x^(2))/(9) - (y^2)/(16) = 1 and (x^(2))/(16) - (y^(2))/(9) = 1 therefore " " e(1) = sqrt(1 + (16)/(9)) = (5)/(3) and e(2) = sqrt(1 + (9)/(16)) = (5)/(4) Now , (1)/(e(1)^(2)) + (1)/(e(2)^(2)) = (9)/...
Describe the similarities and differences between the two curves \vec{\gamma}_{1}(t) = (3 + 3t)\vec{i} + (1 - t)\vec{j} + (3 + 4t)\vec{k}, -\infty\leq t\leq \infty and \vec{\gamma}_{2}(t) = (3 + 3t^{2 How would i answer...