Evaluate \(\sqrt{\frac{s^2 - (b+c)s + bc}{bc}}\) when \(b=25\), \(c=7\), and \(s=30\).
Answer (2)
The expression b c s 2 − ( b + c ) s + b c evaluates to approximately 0.81 when substituting b = 25 , c = 7 , and s = 30 . This is calculated step-by-step by substituting values and simplifying the expression. The final result represents the square root of the ratio derived from the given variables.
;
To evaluate b c s 2 − ( b + c ) s + b c with the given values b = 25 , c = 7 , and s = 30 , we should first substitute these values into the expression step-by-step.
Substitute the values: Expression: b c s 2 − ( b + c ) s + b c Substitute b = 25 , c = 7 , s = 30 25 ⋅ 7 3 0 2 − ( 25 + 7 ) ⋅ 30 + 25 ⋅ 7
Calculate inside the numerator first:
3 0 2 = 900
b + c = 25 + 7 = 32 and ( b + c ) s = 32 ⋅ 30 = 960
b c = 25 ⋅ 7 = 175
Substitute back: 900 − 960 + 175 Which simplifies to: 900 − 960 + 175 = 115
Substitute the simplified numerator and calculate the denominator:
b c = 25 ⋅ 7 = 175
Therefore the expression becomes: 175 115
Simplify the fraction:
Divide the numerator and the denominator by their greatest common divisor, which is 5. 175 115 = 175 ÷ 5 115 ÷ 5 = 35 23
Calculate the square root:
The final expression becomes: 35 23
This expression, 35 23 , is the simplified form of the given expression. Since neither 23 nor 35 are perfect squares, this is the simplest rational form of the expression.
