If you think that multiplying by two means increasing the exponent by 1, think again. Here are the possible cases for IEEE 754 floating-point arithmetic:
Case 1: Infinity and NaN stay unchanged.
Case 2: Floating-point numbers with the largest possible exponent are changed to Infinity by increasing the exponent and setting the mantissa except for the sign bit to zero.
Case 3: Normalised floating-point numbers with exponent less than the maximum possible exponent have their exponent increased by one. Yippee!!!
Case 4: Denormalised floating-point numbers with the highest mantissa bit set have their exponent increased by one, turning them into normalised numbers.
Case 5: Denormalised floating-point numbers with the highest mantissa bit cleared, including +0 and -0, have their mantissa shifted to the left by one bit position, leaving the exponent unchanged.
I very much doubt that a compiler producing integer code handling all these cases correctly will be anywhere as fast as the floating-point built into the processor. And it's only suitable for multiplication by 2.0. For multiplication by 4.0 or 0.5, a whole new set of rules applies. And for the case of multiplication by 2.0, you might try to replace x * 2.0 with x + x, and many compilers do this. That is they do it, because a processor might be able for example to do one addition and one multiplication at the same time, but not one of each kind. So sometimes you would prefer x * 2.0, and sometimes x + x, depending on what other operations need doing at the same time.