Question

geometry quiz 1 unit 8

1. give another name for line hk
2. name a line containing point i
3. name a point collinear to point n
4. name the intersection of plane m and line h
5. name three non - collinear points
6. give another name for line s
7. name the intersection of lines c and s
8. give another name for plane m
9. name a segment containing point q
10. name three collinear points.

Explanation:

Step1: Analyze line naming

In geometry, a line can be named using any two points on it. For the first question asking for another name for line $AB$, if there are other points on the line like $C$ and $D$ that are collinear with $A$ and $B$, it could be named $BA$ or using other collinear points.

Step2: Identify line with a point

To name a line containing point $I$, we look for a line that passes through $I$. If there is a line with points $I$ and $J$ on it, we can name it line $IJ$ or $JI$.

Step3: Find a point collinear to another

For naming a point collinear to point $K$, we search for other points that lie on the same straight - line as $K$.

Step4: Determine intersection of plane and line

The intersection of plane $R$ and line $H$ is the point where the line pierces the plane. If the line intersects the plane at point $P$, then the intersection is point $P$.

Step5: Select non - collinear points

Non - collinear points are points that do not lie on the same straight line. We can choose three points that are not in a straight line, like points $X$, $Y$, and $Z$.

Step6: Rename line

Similar to step 1, for another name for line $s$, we can use two different points on line $s$.

Step7: Find intersection of lines

The intersection of lines $c$ and $d$ is the point where the two lines cross each other. If they cross at point $Q$, then the intersection is point $Q$.

Step8: Rename plane

A plane can be named by three non - collinear points on it. If points $A$, $B$, and $C$ are non - collinear and lie on plane $M$, we can name the plane as plane $ABC$.

Step9: Identify segment with a point

A line segment is a part of a line with two endpoints. If point $Q$ lies on a segment with endpoints $E$ and $F$, we can name the segment as segment $EQ$ or $QF$ or $EF$ (as long as $Q$ is between $E$ and $F$).

Step10: Select collinear points

Collinear points are points that lie on the same straight line. We can choose three points on a straight line, like points $L$, $M$, and $N$.

Since no specific figure details are given in the text (only the questions and some non - descriptive figures in the background), we can't give specific answers. But the general way to answer these questions is as above. If we assume some made - up points for illustration:

1. If line $AB$ has points $A$ and $B$ on it, another name could be $BA$.
2. If there is a line $IJ$ and point $I$ lies on it, the line is named $IJ$.
3. If point $K$ is on a line with points $L$ and $M$, a collinear point to $K$ could be $L$.
4. If line $H$ intersects plane $R$ at point $P$, the intersection is point $P$.
5. If points $X$, $Y$, and $Z$ are not on the same line, they are non - collinear.
6. If line $s$ has points $C$ and $D$ on it, another name could be $CD$.
7. If lines $c$ and $d$ intersect at point $Q$, the intersection is point $Q$.
8. If points $A$, $B$, and $C$ are on plane $M$, another name for plane $M$ is plane $ABC$.
9. If point $Q$ is on segment $EF$, a segment containing point $Q$ is segment $EF$.
10. If points $L$, $M$, and $N$ are on the same line, they are collinear points.

Answer:

1. Another name for line $AB$: $BA$
2. Name a line containing point $I$: $IJ$ (assuming there is a line with points $I$ and $J$)
3. Name a point collinear to point $K$: $L$ (assuming $K$ and $L$ are on the same line)
4. Name the intersection of plane $R$ and line $H$: Point $P$ (assuming intersection is at point $P$)
5. Name three non - collinear points: $X$, $Y$, $Z$ (assuming these points are non - collinear)
6. Give another name for line $s$: $CD$ (assuming points $C$ and $D$ are on line $s$)
7. Name the intersection of lines $c$ and $d$: Point $Q$ (assuming intersection is at point $Q$)
8. Give another name for plane $M$: Plane $ABC$ (assuming $A$, $B$, $C$ are non - collinear points on plane $M$)
9. Name a segment containing point $Q$: Segment $EF$ (assuming $Q$ is on segment $EF$)
10. Name three collinear points: $L$, $M$, $N$ (assuming these points are collinear)