9th-Grade-Math---USA
Relation-within-Triangles
Easy
Question
The set of side lengths that forms the triangle are
- 3yd, 1 yd, 5yd
- 9ft, 5ft, 8ft
- 11 in, 16 in, 27 in
- 24 in, 11 in, 12 in
The correct answer is: 9ft, 5ft, 8ft
Related Questions to study
9th-Grade-Math---USA
The other name of concurrency of angular bisectors is
The other name of concurrency of angular bisectors is
9th-Grade-Math---USARelation-within-Triangles
9th-Grade-Math---USA
In the diagram, if M is centroid of , TS = 57, then the value of SM is
In the diagram, if M is centroid of , TS = 57, then the value of SM is
9th-Grade-Math---USARelation-within-Triangles
9th-Grade-Math---USA
If P is the centroid of , SC = 2100 feet, then the value of PS is
If P is the centroid of , SC = 2100 feet, then the value of PS is
9th-Grade-Math---USARelation-within-Triangles
9th-Grade-Math---USA
The length of is
The length of is
9th-Grade-Math---USARelation-within-Triangles
9th-Grade-Math---USA
The other name of concurrency of medians is
The other name of concurrency of medians is
9th-Grade-Math---USARelation-within-Triangles
9th-Grade-Math---USA
The other name of concurrency of altitudes is
The other name of concurrency of altitudes is
9th-Grade-Math---USARelation-within-Triangles
9th-Grade-Math---USA
In the diagram, if is the perpendicular bisector of , then the value of MN is
In the diagram, if is the perpendicular bisector of , then the value of MN is
9th-Grade-Math---USARelation-within-Triangles
9th-Grade-Math---USA
In the diagram, if M is the centroid of , CM = 36, then the value of MR is
In the diagram, if M is the centroid of , CM = 36, then the value of MR is
9th-Grade-Math---USARelation-within-Triangles
9th-Grade-Math---USA
In the diagram, N is the incentre of .
The statement that cannot be deducted from the figure is
In the diagram, N is the incentre of .
The statement that cannot be deducted from the figure is
9th-Grade-Math---USARelation-within-Triangles
9th-Grade-Math---USA
The length of is
The length of is
9th-Grade-Math---USARelation-within-Triangles
9th-Grade-Math---USA
Centroid divides the median in the ratio (from the vertex)
Centroid divides the median in the ratio (from the vertex)
9th-Grade-Math---USARelation-within-Triangles
9th-Grade-Math---USA
List the sides in order from smallest to largest.
List the sides in order from smallest to largest.
9th-Grade-Math---USARelation-within-Triangles
9th-Grade-Math---USA
The co-ordinates of the centroid D of having vertices as R(-6, 2), S(-2, 6), T(2, 4) is
The co-ordinates of the centroid D of having vertices as R(-6, 2), S(-2, 6), T(2, 4) is
9th-Grade-Math---USARelation-within-Triangles
9th-Grade-Math---USA
If WZ is the perpendicular bisector of XY, then the value of XZ is
If WZ is the perpendicular bisector of XY, then the value of XZ is
9th-Grade-Math---USARelation-within-Triangles
9th-Grade-Math---USA
In the diagram, if is a mid-segment of , then the value of AC is
In the diagram, if is a mid-segment of , then the value of AC is
9th-Grade-Math---USARelation-within-Triangles