simplify 4 of [16-{72 divided by(3+15*3)}+2] by brainly
Answers
Answered by
1
YUP! HERE IS YOUR ANSWER !!!!!
In simplification of fractions parenthesis can also be used. The three parenthesis (1st), {2nd}, [3rd] are used commonly.
In simplification of fractions parenthesis can also be used. The three parenthesis (1st), {2nd}, [3rd] are used commonly.Examples on simplification of fractions:
In simplification of fractions parenthesis can also be used. The three parenthesis (1st), {2nd}, [3rd] are used commonly.Examples on simplification of fractions:1. 3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4
In simplification of fractions parenthesis can also be used. The three parenthesis (1st), {2nd}, [3rd] are used commonly.Examples on simplification of fractions:1. 3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4Solution:
In simplification of fractions parenthesis can also be used. The three parenthesis (1st), {2nd}, [3rd] are used commonly.Examples on simplification of fractions:1. 3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4Solution:3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4
In simplification of fractions parenthesis can also be used. The three parenthesis (1st), {2nd}, [3rd] are used commonly.Examples on simplification of fractions:1. 3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4Solution:3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4= (3 × 3 + 1)/3 ÷ 5/3 – 1/10 of (2 × 2 + 1)/2 + 7/4
In simplification of fractions parenthesis can also be used. The three parenthesis (1st), {2nd}, [3rd] are used commonly.Examples on simplification of fractions:1. 3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4Solution:3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4= (3 × 3 + 1)/3 ÷ 5/3 – 1/10 of (2 × 2 + 1)/2 + 7/4= 10/3 ÷ 5/3 - 1/10 of 5/2 + 7/4
In simplification of fractions parenthesis can also be used. The three parenthesis (1st), {2nd}, [3rd] are used commonly.Examples on simplification of fractions:1. 3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4Solution:3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4= (3 × 3 + 1)/3 ÷ 5/3 – 1/10 of (2 × 2 + 1)/2 + 7/4= 10/3 ÷ 5/3 - 1/10 of 5/2 + 7/4 [‘of’ simplified]
In simplification of fractions parenthesis can also be used. The three parenthesis (1st), {2nd}, [3rd] are used commonly.Examples on simplification of fractions:1. 3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4Solution:3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4= (3 × 3 + 1)/3 ÷ 5/3 – 1/10 of (2 × 2 + 1)/2 + 7/4= 10/3 ÷ 5/3 - 1/10 of 5/2 + 7/4 [‘of’ simplified]= 10/3 × 3/5 – ½ × ½ + 7/4 [‘÷’ simplified]
In simplification of fractions parenthesis can also be used. The three parenthesis (1st), {2nd}, [3rd] are used commonly.Examples on simplification of fractions:1. 3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4Solution:3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4= (3 × 3 + 1)/3 ÷ 5/3 – 1/10 of (2 × 2 + 1)/2 + 7/4= 10/3 ÷ 5/3 - 1/10 of 5/2 + 7/4 [‘of’ simplified]= 10/3 × 3/5 – ½ × ½ + 7/4 [‘÷’ simplified]= 2/1 - ¼ + 7/4 [‘×’ simplified]
In simplification of fractions parenthesis can also be used. The three parenthesis (1st), {2nd}, [3rd] are used commonly.Examples on simplification of fractions:1. 3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4Solution:3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4= (3 × 3 + 1)/3 ÷ 5/3 – 1/10 of (2 × 2 + 1)/2 + 7/4= 10/3 ÷ 5/3 - 1/10 of 5/2 + 7/4 [‘of’ simplified]= 10/3 × 3/5 – ½ × ½ + 7/4 [‘÷’ simplified]= 2/1 - ¼ + 7/4 [‘×’ simplified]= (2 × 4)/1 × 4) - (1 × 1)/4 × 1) + (7 × 1)/4 × 1)
In simplification of fractions parenthesis can also be used. The three parenthesis (1st), {2nd}, [3rd] are used commonly.Examples on simplification of fractions:1. 3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4Solution:3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4= (3 × 3 + 1)/3 ÷ 5/3 – 1/10 of (2 × 2 + 1)/2 + 7/4= 10/3 ÷ 5/3 - 1/10 of 5/2 + 7/4 [‘of’ simplified]= 10/3 × 3/5 – ½ × ½ + 7/4 [‘÷’ simplified]= 2/1 - ¼ + 7/4 [‘×’ simplified]= (2 × 4)/1 × 4) - (1 × 1)/4 × 1) + (7 × 1)/4 × 1)= 8/4 - ¼ + 7/4
In simplification of fractions parenthesis can also be used. The three parenthesis (1st), {2nd}, [3rd] are used commonly.Examples on simplification of fractions:1. 3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4Solution:3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4= (3 × 3 + 1)/3 ÷ 5/3 – 1/10 of (2 × 2 + 1)/2 + 7/4= 10/3 ÷ 5/3 - 1/10 of 5/2 + 7/4 [‘of’ simplified]= 10/3 × 3/5 – ½ × ½ + 7/4 [‘÷’ simplified]= 2/1 - ¼ + 7/4 [‘×’ simplified]= (2 × 4)/1 × 4) - (1 × 1)/4 × 1) + (7 × 1)/4 × 1)= 8/4 - ¼ + 7/4[Now the denominators are same of all the fractions]
In simplification of fractions parenthesis can also be used. The three parenthesis (1st), {2nd}, [3rd] are used commonly.Examples on simplification of fractions:1. 3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4Solution:3 1/3 ÷ 5/3 - 1/10 of 2 ½ + 7/4= (3 × 3 + 1)/3 ÷ 5/3 – 1/10 of (2 × 2 + 1)/2 + 7/4= 10/3 ÷ 5/3 - 1/10 of 5/2 + 7/4 [‘of’ simplified]= 10/3 × 3/5 – ½ × ½ + 7/4 [‘÷’ simplified]= 2/1 - ¼ + 7/4 [‘×’ simplified]= (2 × 4)/1 × 4) - (1 × 1)/4 × 1) + (7 × 1)/4 × 1)= 8/4 - ¼ + 7/4[Now the denominators are same of all the fractions]= (8 – 1 + 7)/4 simplified]
simplified]= 14/4
simplified]= 14/4= 7/
HOPE IT HELPS YOU......... PLEASE MARK AS THE BRAINLIEST...... FOLLOW ME
Answered by
2
Answer:
\frac{-177}{286}
286
−177
Explanation:
Given,
\left(\frac{3}{11}\times\frac{5}{6}\right)-\left(\frac{9}{12}\times \frac{4}{3}\right)+\left(\frac{5}{13}\times \frac{6}{15}\right)(
11
3
×
6
5
)−(
12
9
×
3
4
)+(
13
5
×
15
6
)
=\left(\frac{5}{22}\right )-\left(\frac{36}{36}\right)+\left(\frac{2}{13}\right)(
22
5
)−(
36
36
)+(
13
2
)
=\left(\frac{5}{22}\right )-1+\left(\frac{2}{13}\right)(
22
5
)−1+(
13
2
)
=\frac{5\times 13-286+2\times 22}{286}
286
5×13−286+2×22
=\frac{65-286+44}{286}
286
65−286+44
=\frac{109-286}{286}
286
109−286
= \frac{-177}{286}
286
−177
••••
HOPE BRANLIEST AND FOLLOW ME
Similar questions