Mathematics
Grade-2
Easy
Question
8 - 6 = ____
THINK 6 + ___ = 8
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)
- 0
- 1
- 2
- 3
Hint:
Subtraction is a fundamental arithmetic operation of mathematics.
The correct answer is: 2
Step 1 of 1:
We have given an expression ![8 minus 6 equals _ _ _ _ _](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAF8AAAANCAYAAADPCrIJAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAMyZLetQAAAUtJREFUeNpjYEAALiCeBMRfgPgHEO8AYmkG2gFTIF4FxJ+g9m0CYnuGEQrmAnErELMAMRsQdwDxSRrZlQYNbDUonw+Io4H48EgN/B9ofCYg/kUDe7SA+AzDKEABoOKGBy3wH9PAnplAHDka3KgAVN7nIfEtgbiHBvbcAGJJEvX8JwIPaaAHLWZA+CAQPwdiWxoVb6Cyfh0Qf4PadwZa5o9IIA/ES6Epkg0qZgzEd6GRQs3UCBI/B8Re0ModVLxZA/EtIM4aiYG/DkcgOwLxfirb9QlHE9YAiJ+OxGLnB5ly5IBt0NSODfwaiSn/GhCr4GgWPqeyXaCiJRyLuAYN+xWDGgRBI8ARmiqZoGxQmZ9BZbvYoBV6MrTMBwFzIL4ExC4jtdINhVaEv6BFDSiAAmhklygQz4b2Lf5A7bJlGAXDBnBAExE6fjlI5BkAXhNzfNLYaRQAAACZdEVYdE1hdGhNTAA8bWF0aCB4bWxucz0iaHR0cDovL3d3dy53My5vcmcvMTk5OC9NYXRoL01hdGhNTCI+PG1uPjg8L21uPjxtbz4tPC9tbz48bW4+NjwvbW4+PG1vPj08L21vPjxtaT5fPC9taT48bWk+XzwvbWk+PG1pPl88L21pPjxtaT5fPC9taT48bWk+XzwvbWk+PC9tYXRoPkn+8rkAAAAASUVORK5CYII=)
So,
8 - 6 =2
For subtraction of two terms, both term should belong to same unit.