Use the properties of operations and rules for multiplying and dividing to solve:
(89)×(−34)÷(19)×(−45)÷(35)
(1 point)
Using the properties of operations and the rules for multiplying and dividing:
(89) × (-34) ÷ (19) × (-45) ÷ (35)
First, we can simplify the expression by multiplying and dividing from left to right:
89 × (-34) = -3026
-3026 ÷ 19 = -159.26
-159.26 × (-45) = 7166.7
7166.7 ÷ 35 = 204.476
Therefore, (89) × (-34) ÷ (19) × (-45) ÷ (35) equals approximately 204.476.
That's wrong
I apologize for the mistake. Let's solve the expression again using the correct order of operations.
(89) × (-34) ÷ (19) × (-45) ÷ (35)
First, we'll multiply the numbers:
(89) × (-34) = -3026
Next, we'll divide:
-3026 ÷ (19) = -159.26315789473685
Then, we'll continue multiplying and dividing:
-159.26315789473685 × (-45) = 7166.8421052631575
7166.8421052631575 ÷ (35) = 204.4812030075188
Thus, (89) × (-34) ÷ (19) × (-45) ÷ (35) equals approximately 204.4812030075188.
Still wrong
Apologies for the confusion. Let's solve the expression correctly:
(89) × (-34) ÷ (19) × (-45) ÷ (35)
First, let's perform the multiplication:
(89) × (-34) = -3026
Next, let's perform the division from left to right:
-3026 ÷ (19) = -159.26315789473685
Now, let's continue with the multiplication and division:
-159.26315789473685 × (-45) = 7166.842105263158
7166.842105263158 ÷ (35) = 204.4820634920635
Therefore, (89) × (-34) ÷ (19) × (-45) ÷ (35) equals approximately 204.4820634920635.
Use the properties of operations and rules for multiplying and dividing to solve:
(8/9)×(−3/4)÷(1/9)×(−4/5)÷(3/5)
(1 point)
Using the properties of operations and the rules for multiplying and dividing:
(8/9) × (-3/4) ÷ (1/9) × (-4/5) ÷ (3/5)
First, let's multiply the fractions from left to right:
(8/9) × (-3/4) = -24/36 = -2/3
Next, let's divide the fractions from left to right:
(-2/3) ÷ (1/9) = (-2/3) * (9/1) = -18/3 = -6
Now, let's continue multiplying and dividing:
-6 × (-4/5) = 24/5
Finally, let's divide:
(24/5) ÷ (3/5) = (24/5) * (5/3) = 120/15 = 8
Therefore, (8/9) × (-3/4) ÷ (1/9) × (-4/5) ÷ (3/5) equals 8.
Use the properties of operations and rules for multiplying and dividing to solve:
(−3/5)×(5/16)×(7/12)÷(−3/16)×(−5/7)
(1 point)
Using the properties of operations and the rules for multiplying and dividing:
(-3/5) × (5/16) × (7/12) ÷ (-3/16) × (-5/7)
First, let's multiply the fractions from left to right:
(-3/5) × (5/16) = -15/80 = -3/16
Next, let's continue multiplying the fractions:
(-3/16) × (7/12) = -21/192 = -7/64
Now, let's multiply the remaining fraction:
(-7/64) × (-5/7) = 35/64
Therefore, (-3/5) × (5/16) × (7/12) ÷ (-3/16) × (-5/7) equals 35/64