9th-Grade-Math---USA
Congruent-Triangles
Easy
Question
![](data:image/png;base64,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)
The value of x is
- 0.5
- 2
- 1.5
- 1
The correct answer is: 1
Related Questions to study
9th-Grade-Math---USA
The value of x is
![](data:image/png;base64,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)
The value of x is
![](data:image/png;base64,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)
9th-Grade-Math---USACongruent-Triangles
9th-Grade-Math---USA
If 2xo, 4xo & 60o are the interior angles of
ABC, then the largest angle in the triangle is
If 2xo, 4xo & 60o are the interior angles of
ABC, then the largest angle in the triangle is
9th-Grade-Math---USACongruent-Triangles
9th-Grade-Math---USA
In an equilateral triangle, if the length of 3 sides are 3x + 1, 4y – 3 & 5, the values of x & y are
In an equilateral triangle, if the length of 3 sides are 3x + 1, 4y – 3 & 5, the values of x & y are
9th-Grade-Math---USACongruent-Triangles
9th-Grade-Math---USA
The value of x is
![](data:image/png;base64,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)
The value of x is
![](data:image/png;base64,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)
9th-Grade-Math---USACongruent-Triangles
9th-Grade-Math---USA
The true statement among the following:
The true statement among the following:
9th-Grade-Math---USACongruent-Triangles
9th-Grade-Math---USA
If
, then ![m angle F equals](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAADsAAAAOCAYAAACRkmStAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAANvpXuIwAAASBJREFUeNpjYBg44MYwQsA0IF6OQ+4HEP9Hw7+AmGkoenQmEL8DYnMscipAfGG4xOhCPB4FgQAgXkoPh9QDcTkQiwPxJCB+CcTPgdgLKi8IxH1Qx34C4koSzV9MwKPIbqA5WAW17AwQRwIxCxDLA/F9IJYE4oNAHA4Vl4XmLXEizV5DhEdhbggg0sz/RGCc4BYQ74XGIDJ4CsSzcYhLEnAQqFBZR6RHYW5Ad7A0tWMV5KhvQMxFojg+wEKiR0FmfqFHEgY5Zj8VxJE9uoUEj8LM3EuCm8lOxqA8Op8K4iDABsTbSPQoITOpCkClbxoVxDmAeAcZHoWZmUwPz65DqmLIFeeCJkNyPIrPLqqDd9BYoUR8P5H5CIaXE2nXKCAHAAA/0Gi1b4kLnAAAAG50RVh0TWF0aE1MADxtYXRoIHhtbG5zPSJodHRwOi8vd3d3LnczLm9yZy8xOTk4L01hdGgvTWF0aE1MIj48bWk+bTwvbWk+PG1vPiYjeDIyMjA7PC9tbz48bWk+RjwvbWk+PG1vPj08L21vPjwvbWF0aD6QNNWrAAAAAElFTkSuQmCC)
If
, then ![m angle F equals](data:image/png;base64,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)
9th-Grade-Math---USACongruent-Triangles
9th-Grade-Math---USA
![](data:image/png;base64,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)
The value of x in the figure is
![](data:image/png;base64,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)
The value of x in the figure is
9th-Grade-Math---USACongruent-Triangles
9th-Grade-Math---USA
![](data:image/png;base64,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)
The perimeter of the triangle is
![](data:image/png;base64,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)
The perimeter of the triangle is
9th-Grade-Math---USACongruent-Triangles
9th-Grade-Math---USA
are the interior angles of
ABC, then the largest angle of
ABC is
are the interior angles of
ABC, then the largest angle of
ABC is
9th-Grade-Math---USACongruent-Triangles
9th-Grade-Math---USA
In 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)
![straight m angle straight A space equals](data:image/png;base64,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)
In ![](data:image/png;base64,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)
![straight m angle straight A space equals](data:image/png;base64,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)
9th-Grade-Math---USACongruent-Triangles
9th-Grade-Math---USA
The value of y is
![](data:image/png;base64,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)
The value of y is
![](data:image/png;base64,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)
9th-Grade-Math---USACongruent-Triangles
9th-Grade-Math---USA
If
are supplementary,
, then
is
If
are supplementary,
, then
is
9th-Grade-Math---USACongruent-Triangles
9th-Grade-Math---USA
Suppose
, then
=
Suppose
, then
=
9th-Grade-Math---USACongruent-Triangles
9th-Grade-Math---USA
Classify the triangle
if
is
Classify the triangle
if
is
9th-Grade-Math---USACongruent-Triangles
9th-Grade-Math---USA
The value of x in the diagram if it is an isosceles triangle is
![](data:image/png;base64,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)
The value of x in the diagram if it is an isosceles triangle is
![](data:image/png;base64,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)
9th-Grade-Math---USACongruent-Triangles