Any point on the x-axis is of the form $(x,0,0)$. Therefore its y-coordinate is $0$ and its z-coordinate is $0$.
Its y-coordinate and z-coordinate are both $0$.
The XZ-plane consists of all points of the form $(x,0,z)$. Hence the y-coordinate of any point in the XZ-plane is $0$.
Its y-coordinate is $0$.
Using the NCERT octant convention: I is $(+,+,+)$, II is $(-,+,+)$, III is $(-,-,+)$, IV is $(+,-,+)$, V is $(+,+,-)$, VI is $(-,+,-)$, VII is $(-,-,-)$ and VIII is $(+,-,-)$. Applying these signs to the points gives I, IV, VIII, V, VI, II, III and VII.
I, IV, VIII, V, VI, II, III and VII, respectively.
The x-axis and y-axis determine the XY-plane. Points in the XY-plane have zero z-coordinate, so they are of the form $(x,y,0)$. The three coordinate planes divide space into eight octants.
(i) XY-plane; (ii) $(x,y,0)$; (iii) eight.
Use $d=\sqrt{(x_2-x_1)^2+(y_2-y_1)^2+(z_2-z_1)^2}$. (i) $\sqrt{2^2+0^2+(-4)^2}=2\sqrt5$. (ii) $\sqrt{5^2+(-3)^2+(-3)^2}=\sqrt{43}$. (iii) $\sqrt{2^2+(-6)^2+8^2}=2\sqrt{26}$. (iv) $\sqrt{(-4)^2+2^2+0^2}=2\sqrt5$.
(i) $2\sqrt5$; (ii) $\sqrt{43}$; (iii) $2\sqrt{26}$; (iv) $2\sqrt5$.
Let $A=(-2,3,5)$, $B=(1,2,3)$ and $C=(7,0,-1)$. Then $AB=\sqrt{3^2+(-1)^2+(-2)^2}=\sqrt{14}$, $BC=\sqrt{6^2+(-2)^2+(-4)^2}=2\sqrt{14}$, and $AC=\sqrt{9^2+(-3)^2+(-6)^2}=3\sqrt{14}$. Since $AB+BC=AC$, the three points are collinear.
The points are collinear.
(i) For the three points, the squared side lengths are $18,18,36$, so two sides are equal and the triangle is isosceles. (ii) The squared side lengths are again $18,18,36$, so $18+18=36$; hence the triangle is right angled. (iii) Let the points be $A,B,C,D$ in order. Then $\overrightarrow{AB}=(2,-4,4)=\overrightarrow{DC}$ and $\overrightarrow{BC}=(3,-5,3)=\overrightarrow{AD}$. Opposite sides are equal and parallel, so the quadrilateral is a parallelogram.
All three statements are verified.
Let $P(x,y,z)$ be equidistant from $A(1,2,3)$ and $B(3,2,-1)$. Then $(x-1)^2+(y-2)^2+(z-3)^2=(x-3)^2+(y-2)^2+(z+1)^2$. Simplifying gives $4x-8z=0$, or $x-2z=0$.
$x-2z=0$.
The fixed points are foci on the x-axis with distance $2c=8$, so $c=4$. The constant sum is $2a=10$, so $a=5$. Hence $b^2=a^2-c^2=25-16=9$. The locus is the ellipsoid obtained by rotating the ellipse about the x-axis: $\dfrac{x^2}{25}+\dfrac{y^2}{9}+\dfrac{z^2}{9}=1$.
$\dfrac{x^2}{25}+\dfrac{y^2}{9}+\dfrac{z^2}{9}=1$.
For consecutive vertices $A,B,C,D$ of a parallelogram, $D=A+C-B$. Thus $D=(3,-1,2)+(-1,1,2)-(1,2,-4)=(1,-2,8)$.
$(1,-2,8)$.
Let $C=(6,0,0)$. The midpoint of $BC$ is $(3,2,0)$, so the median from $A$ has length $\sqrt{3^2+2^2+(-6)^2}=7$. The midpoint of $AC$ is $(3,0,3)$, so the median from $B$ has length $\sqrt{3^2+(-4)^2+3^2}=\sqrt{34}$. The midpoint of $AB$ is $(0,2,3)$, so the median from $C$ has length $\sqrt{(-6)^2+2^2+3^2}=7$.
$7,\sqrt{34},7$.
Since the centroid is the origin, the average of x-coordinates, y-coordinates and z-coordinates is 0. Thus $2a-4+8=0$, $2+3b+14=0$, and $6-10+2c=0$. Solving gives $a=-2$, $b=-\dfrac{16}{3}$ and $c=2$.
$a=-2$, $b=-\dfrac{16}{3}$ and $c=2$.
Let $P=(x,y,z)$. Then $PA^2=(x-3)^2+(y-4)^2+(z-5)^2$ and $PB^2=(x+1)^2+(y-3)^2+(z+7)^2$. Adding and setting the sum equal to $k^2$ gives $2x^2+2y^2+2z^2-4x-14y+4z+109=k^2$.
$2x^2+2y^2+2z^2-4x-14y+4z+109=k^2$.