The values of lambda,for which the point (lam | vedclass

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(A) The point $(\lambda, \lambda-2)$ lies inside the ellipse $4x^2+9y^2=36$. Substituting the point into the ellipse equation: $4\lambda^2 + 9(\lambda

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$0 < \lambda < 1$

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(A) The point $(\lambda, \lambda-2)$ lies inside the ellipse $4x^2+9y^2=36$. Substituting the point into the ellipse equation: $4\lambda^2 + 9(\lambda-2)^2 $4\lambda^2 + 9(\lambda^2 - 4\lambda + 4) $4\lambda^2 + 9\lambda^2 - 36\lambda + 36 $13\lambda^2 - 36\lambda $\lambda(13\lambda - 36) Thus,$0 The point $(\lambda, \lambda-2)$ lies outside the parabola $y^2=x$. Substituting the point into the parabola condition $y^2 - x > 0$: $(\lambda-2)^2 - \lambda > 0$ $\lambda^2 - 4\lambda + 4 - \lambda > 0$ $\lambda^2 - 5\lambda + 4 > 0$ $(\lambda-4)(\lambda-1) > 0$ Thus,$\lambda \in (-\infty, 1) \cup (4, \infty)$ (ii). Taking the intersection of $(i)$ and (ii): $0 4)$. Since $\frac{36}{13} \approx 2.76$,the intersection is $0 < \lambda < 1$.

The values of $\lambda$,for which the point $(\lambda, \lambda-2)$ lies inside the ellipse $4x^2+9y^2=36$ and outside the parabola $y^2=x$,satisfy:

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