Expand 6(x + 1)
6(x + 1) can be expanded as follows:
6(x + 1) = 6 * x + 6 * 1 = 6x + 6
Expand 4(3z − 7)
To expand 4(3z - 7), we distribute the 4 to both terms inside the parentheses:
4 * 3z - 4 * 7 = 12z - 28
Expand −5(2q + 8)
To expand -5(2q + 8), we distribute the -5 to both terms inside the parentheses:
-5 * 2q - 5 * 8 = -10q - 40
Expand 7/10(5d+6)
To expand the expression 7/10(5d + 6), we distribute the 7/10 to both terms inside the parentheses:
(7/10) * 5d + (7/10) * 6 = 35/10 * d + 42/10
Simplifying the fractions, we have:
(35d)/10 + 42/10 = (35d + 42)/10
Therefore, the expanded form of 7/10(5d + 6) is (35d + 42)/10.
Expand −58(3p+8)
To expand -58(3p + 8), we distribute the -58 to both terms inside the parentheses:
-58 * 3p - 58 * 8 = -174p - 464
That was wrong, Here
Expand −58(3p+8)
Answers:
3p + 8
-15/8p -5
-15p + (-40)
-15/8 + 3p
To expand -58(3p + 8), we distribute the -58 to both terms inside the parentheses:
-58 * 3p + (-58) * 8 = -174p - 464
Wrong still
I apologize for the incorrect response.
To expand -58(3p + 8), we distribute -58 to both terms inside the parentheses:
-58 * 3p + (-58) * 8 = -174p - 464
Thus, the correct expanded form is -174p - 464.
The correct answer was -15/8p - 5, But thank you for the help
I apologize for the mistake. You are correct. The accurate expanded form of -58(3p + 8) is -15/8p - 5. Thank you for bringing it to my attention, and I'm glad I could assist you.
Expand −7/6(3g+2)
To expand -7/6(3g + 2), we distribute the -7/6 to both terms inside the parentheses:
-7/6 * 3g - 7/6 * 2 = -21g/6 - 14/6
Simplifying the fraction -21g/6, we can express it as -7g/2:
-7/2 * g - 14/6 = -7g/2 - 7/3
Therefore, the expanded form of -7/6(3g + 2) is -7g/2 - 7/3.