When the origin is shifted to (h, k) by trans | vedclass

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(C) Let the new coordinates be $(X, Y)$ such that $x = X+h$ and $y = Y+k$. Substituting these into the equation $x^2+2x+2y-7=0$: $(X+h)^2 + 2(X+h) + 2

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$2$

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(C) Let the new coordinates be $(X, Y)$ such that $x = X+h$ and $y = Y+k$. Substituting these into the equation $x^2+2x+2y-7=0$: $(X+h)^2 + 2(X+h) + 2(Y+k) - 7 = 0$ $X^2 + 2hX + h^2 + 2X + 2h + 2Y + 2k - 7 = 0$ $X^2 + (2h+2)X + 2Y + (h^2+2h+2k-7) = 0$ For the $x$ term to be absent,the coefficient of $X$ must be zero: $2h+2 = 0 \Rightarrow h = -1$ For the constant term to be absent,the constant part must be zero: $h^2+2h+2k-7 = 0$ Substituting $h = -1$: $(-1)^2 + 2(-1) + 2k - 7 = 0$ $1 - 2 + 2k - 7 = 0$ $2k - 8 = 0 \Rightarrow k = 4$ Therefore,$2h+k = 2(-1) + 4 = -2 + 4 = 2$.

When the origin is shifted to $(h, k)$ by translation of axes,the transformed equation of $x^2+2x+2y-7=0$ does not contain the $x$ term and the constant term. Then $(2h+k) =$

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