It has an absolute minimum at the point (2,3). It has no maximum but the ends of the graph both approach infinity.
It equals 1
2x to the fourth power minus 162 equals -146
113 raised to the power of 9 minus 189 raised to the power of 6 equals 3.0039964e+18
186,000,000
'x' is +4 or -4 .
It equals 1
2x to the fourth power minus 162 equals -146
113 raised to the power of 9 minus 189 raised to the power of 6 equals 3.0039964e+18
If that equals zero, then x = 4
186,000,000
2 times 739 minus !6 equals 117,743,173,416,535,106
'x' is +4 or -4 .
676
+ (plus) - (minus) / (divide) * (multiply) ^ (power) = (equals)
The vertex is (5, 11).
The answer will depend on the nature of the line graph.The range is often restricted when the domain is restricted. In that case, the range is the maximum value attained by the graph minus the minimum value. However, many algebraic graphs are defined from an infinite domain to an infinite range. Any polynomial function of power >1, for example, has an infinite range.The answer will depend on the nature of the line graph.The range is often restricted when the domain is restricted. In that case, the range is the maximum value attained by the graph minus the minimum value. However, many algebraic graphs are defined from an infinite domain to an infinite range. Any polynomial function of power >1, for example, has an infinite range.The answer will depend on the nature of the line graph.The range is often restricted when the domain is restricted. In that case, the range is the maximum value attained by the graph minus the minimum value. However, many algebraic graphs are defined from an infinite domain to an infinite range. Any polynomial function of power >1, for example, has an infinite range.The answer will depend on the nature of the line graph.The range is often restricted when the domain is restricted. In that case, the range is the maximum value attained by the graph minus the minimum value. However, many algebraic graphs are defined from an infinite domain to an infinite range. Any polynomial function of power >1, for example, has an infinite range.
-68 I think