Using Positive Exponents, how do you solve the following problems?
1 Answer
#2x^4y^3# #625a^8b^16# #16777216x^30y^24# #1#
Explanation:
-
#(12x^7y^11)/(6x^3 y^8)#
Since everything on the numerator and denominator is multiplication, you simply divide like terms. When#x^3# is divided by#x# , that is the same as#(x*x*x)/x# . The#x# in the denominator cancels out one of the#x# 's in the numerator, leaving#x^2# . This implies that the exponent 1 in the denominator was subtracted from the exponent 3 in the numerator, leaving an exponent of 2:#x^2# .
By this process,#x^7/x^3=x^4# and#y^11/y^8=y^3#
For the coefficients,#12/6 =2# .
Combined, that is#2x^4y^3# -
#(5a^2b^4)^4#
#(5a^2b^4)^4=(5a^2b^4)*(5a^2b^4)*(5a^2b^4)*(5a^2b^4)#
When you raise an exponent to an exponent, the exponents multiply. The coefficient in the equation is also raised the to exponent. Thus,
#(5a^2b^4)^4=5^4*a^(2*4)*b^(4*4)=625a^8b^16# -
#(4^2x^5y^4)^6=(16x^5y^4)^6=16777216x^30y^24# -
#32^0#
Any number (except 0) raised the the power of 0 is 1.
#32^0=1#
