Chapter 10.7, Problem 21WE

a.

To determine

To fill: The locus of point equidistant $R$ and $S$ is _____.

Answer to Problem 21WE

The locus of points $R$ and $S$ is the perpendicular bisector plane of $RS$ .

Explanation of Solution

Given:

  $R,S,T$ and $W$ are not coplanar and no three of them are collinear.

Calculation:

Draw the points $R,S,T,$ and $W$ .

  

The locus of points equidistant from $R$ and $S$ is the perpendicular bisector plane of $RS$ .

Conclusion: Therefore, the complete statement is: The locus of points equidistant from $R$ and $S$ is the perpendicular bisector plane of $RS$ .

b.

To determine

To fill: The locus of points equidistant from $R$ and $T$ is _________.

Answer to Problem 21WE

The locus of points equidistant from $R$ and $T$ is the perpendicular bisector plane of $RT$ .

Explanation of Solution

Given:

  $R,S,T$ and $W$ are not coplanar and no three of them are collinear.

Calculation:

  

The locus of points equidistant from $R$ and $T$ is the perpendicular bisector plane of $RT$ .

Conclusion:

Therefore, the complete statement is: The locus of points equidistant from $R$ and $T$ is the perpendicular bisector plane of $RT$ .

c.

To determine

To fill: The loci found in parts (a) and ( b ) intersect in a ____ .and all points in this line are _______ from $R,S$ and $T.$

Answer to Problem 21WE

The loci found in parts (a) and ( b ) intersect in a line .and all points in this line are equidistant from $R,S$ and $T.$

Explanation of Solution

Given:

  $R,S,T$ and $W$ are not coplanar and no three of them are collinear.

Given statement: The loci found in parts ( a ) and ( b ) intersect in a line and all points in this line are equidistant from $R,S$ and $T.$

Calculation:

The loci found in parts (a) and ( b ) intersect in a line .and all points in this line are equidistant from $R,S$ and $T.$

This is because all points are in random position.

Conclusion:

Therefore, the complete statement is: The loci found in parts (a) and ( b ) intersect in a line and all points in this line are equidistant from $R,S$ and $T.$

d.

To determine

To fill: The locus of points equidistant from $R$ and $W$ is _____.

Answer to Problem 21WE

The locus of points equidistant from $R$ and $W$ is the perpendicular bisector plane of $RW$ .

Explanation of Solution

Given:

  $R,S,T$ and $W$ are not coplanar and no three of them are collinear.

Given statement: The locus points equidistant from $R$ and $W$ is ?.

Calculation:

  

The locus of points $R$ and $W$ is the perpendicular bisector plane of $RW$ .

Conclusion:

Therefore, the complete statement is: The locus of points equidistant from $R$ and $W$ is the perpendicular bisector plane of $RW$ .

e.

To determine

To fill: The intersection of the figure found in ( c )and ( d ) is a _____. This _____ is equidistant from the four given points.

Answer to Problem 21WE

The intersection of the figure found in ( c )and ( d ) is a point. This point is equidistant from the four given points.

Explanation of Solution

Given:

  $R,S,T,$ and $W$ are not coplanar and no three of them are collinear.

Given statement: The intersection of the figure found in ( c ) and ( d ) is a ?. This ? is equidistant from the four given points.

Calculation:

  

Conclusion:

Therefore, the complete statement is: The intersection of the figure found in ( c ) and ( d ) is a point. This point is equidistant from the four given points.