0
To simplify the expression (\frac{3 \sqrt{t^4}}{6 \sqrt{t^4}}), first note that (\sqrt{t^4} = t^2). This allows us to rewrite the expression as (\frac{3t^2}{6t^2}). Since (t^2) is common in both the numerator and denominator, it cancels out, resulting in (\frac{3}{6}), which simplifies to (\frac{1}{2}). Thus, the final simplified expression is (\frac{1}{2}).
What else can I help you with?
How do you Simplify the expression 18x4y3?
72xy^(3)
What does 3 over 3 simplify to?
It simplify to 1
How do you simplify this expression 3-5(a-4)?
To simplify the expression (3 - 5(a - 4)), first distribute the (-5) across the terms inside the parentheses: (3 - 5a + 20). Then, combine the constant terms (3 + 20) to get (23 - 5a). Therefore, the simplified expression is (23 - 5a).
How do you simplify this expression 3 a plus b minus 3 a minus b?
2b
What is a numerical expression when you replace it with it's single numerical value?
A numerical expression is ' 2 + 3' A numerical equation is ' 2 + 3 = 5'.
Simplify the expression a3b2 over a2b?
1 over a^5b^3
How do you Simplify the expression 18x4y3?
72xy^(3)
How do you simplify this expression 4-3?
4-3 = 1
Simplify each expression 3 over x plus 2 plus x over x plus 2?
11+(7-3)2=
Simplify this expression - -x plus 3?
- - x + 3 = x + 3
What does 3 over 3 simplify to?
It simplify to 1
Simplify the algebraic expression 3x 3 - 2x 3?
3x+3-2x=3 x+3=3 x-0
How do you simplify this expression 3-5(a-4)?
To simplify the expression (3 - 5(a - 4)), first distribute the (-5) across the terms inside the parentheses: (3 - 5a + 20). Then, combine the constant terms (3 + 20) to get (23 - 5a). Therefore, the simplified expression is (23 - 5a).
Simplify each expression 3a 42a-1?
(3+2i)-(3+2i)
How do you simplify this expression 3 a plus b minus 3 a minus b?
2b
How do you simplify 3 times the square root of 7?
The expression cannot be simplified.
What is a numerical expression when you replace it with it's single numerical value?
A numerical expression is ' 2 + 3' A numerical equation is ' 2 + 3 = 5'.
