Question

simplify using BODMAS rule [-10-3×{4-(-4)}×{3-(5-3)}]

Answer 1

Answer:

-34

Step-by-step explanation:

[-10-3×{4-(-4)}×{3-(5-3)}]

Solve the bracket first according to BODMAS rule

= [-10 - 3 × { 4- (- 4)} × {3 - (2)}]

= [-10 - 3 × { 4- (- 4)} × { 1 }]

= [-10-3 × { 4- (- 4)} × { 1 }]

= [-10-3 × {4 + 4} ]

= [-10-3 × { 8} ]

= [ -10-3 × 8 ]

=  [ - 10 - 24 ]

= -34

Answer 2

Answer:

=> -34

Step-by-step explanation:

Given that:-

$[-10-3\times \{4-(-4)\}\times \{3-(5-3)\}]$

To find:- The value of the expression  

For simplifying the expression, we have to use the BODMAS concept.

It is the rule used to remember the order of operations that is followed while solving expressions in mathematics.

         where,

         B= bracket  

         O= order of power or rules  

         D= division  

         M= multiplication  

         A= addition

         S= subtraction  

As we have,

=> $[-10-3\times \{4-(-4)\}\times \{3-(5-3)\}]$

Simplifying it further, we get

=> $[-10 - 3 \times \{ 4- (- 4)\} \times \{3 - (2)\}]$

=> $[-10 - 3 \times \{ 4- (- 4)\}\times \{ 1 \}]$

=> $[-10-3 \times \{ 4- (- 4)\} \times \{ 1 \}]$  

=> $[-10-3 \times \{4 + 4\} ]$  

=> $[-10-3 \times \{ 8\} ]$

=> $[ -10-3 \times 8 ]$  

=> $[ - 10 - 24 ]$

=> $-34$

Hence, the required solution is -34.